From: Ferruccio Guidi Date: Sat, 25 Jan 2020 21:36:39 +0000 (+0100) Subject: update in basic_2 + new tool "roles" X-Git-Tag: make_still_working~199 X-Git-Url: http://matita.cs.unibo.it/gitweb/?p=helm.git;a=commitdiff_plain;h=a1ae862976f2489107dd107937f5e05d0aaa7144 update in basic_2 + new tool "roles" + cpg_drops.ma: a proof updated + roles: new tool for managing names (-r -s -t -w) + names.txt: updated + probe: output URI syntax updated --- diff --git a/matita/components/binaries/probe/engine.ml b/matita/components/binaries/probe/engine.ml index bd452674e..8a8a74ac5 100644 --- a/matita/components/binaries/probe/engine.ml +++ b/matita/components/binaries/probe/engine.ml @@ -34,7 +34,7 @@ let out_int i = P.printf "%u\n" i let out_length uris = out_int (US.cardinal uris) let out_uris uris = - let map uri = P.printf "%s\n" (U.string_of_uri uri) in + let map uri = P.printf "%S\n" (U.string_of_uri uri) in US.iter map uris let is_registry str = diff --git a/matita/matita/contribs/lambdadelta/basic_1A/names.txt b/matita/matita/contribs/lambdadelta/basic_1A/names.txt index d85e05945..91031610a 100644 --- a/matita/matita/contribs/lambdadelta/basic_1A/names.txt +++ b/matita/matita/contribs/lambdadelta/basic_1A/names.txt @@ -1,931 +1,931 @@ -A -Abbr -Abst -abst_dec -AHead -ahead_inj_snd -aplus -aplus_ahead_simpl -aplus_asort_le_simpl -aplus_asort_O_simpl -aplus_asort_simpl -aplus_assoc -aplus_asucc -aplus_asucc_false -aplus_gz_ge -aplus_gz_le -aplus_inj -aplus_reg_r -aplus_sort_O_S_simpl -aplus_sort_S_S_simpl -app1 -Appl -aprem -aprem_asucc -aprem_gen_head_O -aprem_gen_head_S -aprem_gen_sort -aprem_repl -aprem_succ -aprem_zero -arity -arity_abbr -arity_abst -arity_appl -arity_appls_abbr -arity_appls_appl -arity_appls_bind -arity_appls_cast -arity_aprem -arity_bind -arity_cast -arity_cimp_conf -arity_fsubst0 -arity_gen_abst -arity_gen_appl -arity_gen_appls -arity_gen_bind -arity_gen_cast -arity_gen_cvoid -arity_gen_cvoid_subst0 -arity_gen_lift -arity_gen_lref -arity_gen_sort -arity_head -arity_lift -arity_lift1 -arity_mono -arity_nf2_inv_all -arity_repellent -arity_repl -arity_sort -arity_sred_pr2 -arity_sred_pr3 -arity_sred_wcpr0_pr0 -arity_sred_wcpr0_pr1 -arity_subst0 -ASort -asucc -asucc_gen_head -asucc_gen_sort -asucc_inj -asucc_repl -B -Bind -bind_dec_not -binder_dec -C -Cast -cbk -CHead -chead_ctail -cimp -cimp_bind -cimp_flat_dx -cimp_flat_sx -cimp_getl_conf -cle -clear -clear_bind -clear_cle -clear_clear -clear_ctail -clear_flat -clear_gen_all -clear_gen_bind -clear_gen_flat -clear_gen_flat_r -clear_gen_sort -clear_getl_trans -clear_mono -clear_pc3_trans -clear_pr2_trans -clear_pr3_trans -clear_trans -clear_wf3_trans -cle_flt_trans -cle_head -clen -cle_r -cle_trans_head -clt -clt_cong -clt_head -clt_thead -clt_wf_ind -clt_wf__q_ind -cnt -cnt_head -cnt_lift -cnt_sort -CSort -csuba -csuba_abst -csuba_arity -csuba_arity_rev -csuba_clear_conf -csuba_clear_trans -csuba_drop_abbr -csuba_drop_abbr_rev -csuba_drop_abst -csuba_drop_abst_rev -csuba_gen_abbr -csuba_gen_abbr_rev -csuba_gen_abst -csuba_gen_abst_rev -csuba_gen_bind -csuba_gen_bind_rev -csuba_gen_flat -csuba_gen_flat_rev -csuba_gen_void -csuba_gen_void_rev -csuba_getl_abbr -csuba_getl_abbr_rev -csuba_getl_abst -csuba_getl_abst_rev -csuba_head -csuba_refl -csuba_sort -csuba_void -csubc -csubc_abst -csubc_arity_conf -csubc_arity_trans -csubc_clear_conf -csubc_csuba -csubc_drop1_conf_rev -csubc_drop_conf_O -csubc_drop_conf_rev -csubc_gen_head_l -csubc_gen_head_r -csubc_gen_sort_l -csubc_gen_sort_r -csubc_getl_conf -csubc_head -csubc_refl -csubc_sort -csubc_void -csubst0 -csubst0_both -csubst0_both_bind -csubst0_clear_O -csubst0_clear_O_back -csubst0_clear_S -csubst0_clear_trans -csubst0_drop_eq -csubst0_drop_eq_back -csubst0_drop_gt -csubst0_drop_gt_back -csubst0_drop_lt -csubst0_drop_lt_back -csubst0_fst -csubst0_fst_bind -csubst0_gen_head -csubst0_gen_S_bind_2 -csubst0_gen_sort -csubst0_getl_ge -csubst0_getl_ge_back -csubst0_getl_lt -csubst0_getl_lt_back -csubst0_snd -csubst0_snd_bind -csubst1 -csubst1_bind -csubst1_flat -csubst1_gen_head -csubst1_getl_ge -csubst1_getl_ge_back -csubst1_getl_lt -csubst1_head -csubst1_refl -csubst1_sing -csubt -csubt_abst -csubt_clear_conf -csubt_csuba -csubt_drop_abbr -csubt_drop_abst -csubt_drop_flat -csubt_gen_abbr -csubt_gen_abst -csubt_gen_bind -csubt_gen_flat -csubt_getl_abbr -csubt_getl_abst -csubt_head -csubt_pc3 -csubt_pr2 -csubt_refl -csubt_sort -csubt_ty3 -csubt_ty3_ld -csubt_void -csubv -csubv_bind -csubv_bind_same -csubv_clear_conf -csubv_clear_conf_void -csubv_drop_conf -csubv_flat -csubv_getl_conf -csubv_getl_conf_void -csubv_refl -csubv_sort -csubv_void -CTail -c_tail_ind -cweight -dnf_dec -dnf_dec2 -drop -drop1 -drop1_cons -drop1_cons_tail -drop1_csubc_trans -drop1_gen_pcons -drop1_gen_pnil -drop1_getl_trans -drop1_nil -drop1_skip_bind -drop1_trans -drop_clear -drop_clear_O -drop_clear_S -drop_conf_ge -drop_conf_lt -drop_conf_rev -drop_csubc_trans -drop_ctail -drop_drop -drop_gen_drop -drop_gen_refl -drop_gen_skip_l -drop_gen_skip_r -drop_gen_sort -drop_getl_trans_ge -drop_getl_trans_le -drop_getl_trans_lt -drop_mono -drop_refl -drop_S -drop_skip -drop_skip_bind -drop_skip_flat -drop_trans_ge -drop_trans_le -ex1_arity -ex1_c -ex1__leq_sort_SS -ex1_t -ex1_ty3 -ex2_arity -ex2_c -ex2_nf2 -ex2_t -F -Flat -flt -flt_arith0 -flt_arith1 -flt_arith2 -flt_shift -flt_thead_dx -flt_thead_sx -flt_trans -flt_wf_ind -flt_wf__q_ind -fsubst0 -fsubst0_both -fsubst0_fst -fsubst0_gen_base -fsubst0_snd -fweight -G -getl -getl_clear_bind -getl_clear_conf -getl_clear_trans -getl_conf_ge_drop -getl_conf_le -getl_csubst1 -getl_ctail -getl_ctail_clen -getl_dec -getl_drop -getl_drop_conf_ge -getl_drop_conf_lt -getl_drop_conf_rev -getl_drop_trans -getl_flat -getl_flt -getl_gen_2 -getl_gen_all -getl_gen_bind -getl_gen_flat -getl_gen_O -getl_gen_S -getl_gen_sort -getl_gen_tail -getl_head -getl_intro -getl_mono -getl_refl -getl_trans -getl_wf3_trans -gz -iso -iso_flats_flat_bind_false -iso_flats_lref_bind_false -iso_gen_head -iso_gen_lref -iso_gen_sort -iso_head -iso_lref -iso_refl -iso_sort -iso_trans -K -leq -leq_ahead_asucc_false -leq_ahead_false_1 -leq_ahead_false_2 -leq_asucc -leq_asucc_false -leq_eq -leq_gen_head1 -leq_gen_head2 -leq_gen_sort1 -leq_gen_sort2 -leq_head -leq_leqz -leq_refl -leq_sort -leq_sym -leq_trans -leqz -leqz_head -leqz_leq -leqz_sort -lift -lift1 -lift1_bind -lift1_cons_tail -lift1_flat -lift1_free -lift1_lift1 -lift1_lref -lift1_sort -lift1_xhg -lift_bind -lift_d -lift_flat -lift_free -lift_free_sym -lift_gen_bind -lift_gen_flat -lift_gen_head -lift_gen_lift -lift_gen_lref -lift_gen_lref_false -lift_gen_lref_ge -lift_gen_lref_lt -lift_gen_sort -lift_head -lift_inj -lift_lref_ge -lift_lref_gt -lift_lref_lt -lift_r -lifts -lifts1 -lifts1_cons -lifts1_flat -lifts1_nil -lifts1_xhg -lifts_inj -lift_sort -lifts_tapp -lift_tle -lift_tlt_dx -lift_weight -lift_weight_add -lift_weight_add_O -lift_weight_map -llt -llt_head_dx -llt_head_sx -llt_repl -llt_trans -llt_wf_ind -llt_wf__q_ind -lref_map -lweight -lweight_repl -minus_s_s -mk_G -next_plus -next_plus_assoc -next_plus_gz -next_plus_lt -next_plus_next -nf0_dec -nf2 -nf2_abst -nf2_abst_shift -nf2_appl_lref -nf2_appls_lref -nf2_csort_lref -nf2_dec -nf2_gen_abbr -nf2_gen_abst -nf2_gen_beta -nf2_gen_cast -nf2_gen_flat -nf2_gen_lref -nf2_gen__nf2_gen_aux -nf2_gen_void -nf2_iso_appls_lref -nf2_lift -nf2_lift1 -nf2_lref_abst -nf2_pr3_confluence -nf2_pr3_unfold -nf2_sn3 -nf2_sort -nfs2 -nfs2_tapp -node_inh -not_abbr_abst -not_abbr_void -not_abst_void -not_void_abst -pc1 -pc1_head -pc1_head_1 -pc1_head_2 -pc1_pr0_r -pc1_pr0_u -pc1_pr0_u2 -pc1_pr0_x -pc1_refl -pc1_s -pc1_t -pc3 -pc3_abst_dec -pc3_dec -pc3_eta -pc3_fsubst0 -pc3_gen_abst -pc3_gen_abst_shift -pc3_gen_appls_lref_abst -pc3_gen_appls_lref_sort -pc3_gen_appls_sort_abst -pc3_gen_cabbr -pc3_gen_lift -pc3_gen_lift_abst -pc3_gen_not_abst -pc3_gen_sort -pc3_gen_sort_abst -pc3_head_1 -pc3_head_12 -pc3_head_2 -pc3_head_21 -pc3_ind_left -pc3_ind_left__pc3_left_pc3 -pc3_ind_left__pc3_left_pr3 -pc3_ind_left__pc3_left_sym -pc3_ind_left__pc3_left_trans -pc3_ind_left__pc3_pc3_left -pc3_left -pc3_left_r -pc3_left_ur -pc3_left_ux -pc3_lift -pc3_nf2 -pc3_nf2_unfold -pc3_pc1 -pc3_pr0_pr2_t -pc3_pr2_fsubst0 -pc3_pr2_fsubst0_back -pc3_pr2_pr2_t -pc3_pr2_pr3_t -pc3_pr2_r -pc3_pr2_u -pc3_pr2_u2 -pc3_pr2_x -pc3_pr3_conf -pc3_pr3_pc3_t -pc3_pr3_r -pc3_pr3_t -pc3_pr3_x -pc3_refl -pc3_s -pc3_t -pc3_thin_dx -pc3_wcpr0 -pc3_wcpr0__pc3_wcpr0_t_aux -pc3_wcpr0_t -pr0 -pr0_beta -pr0_comp -pr0_confluence -pr0_confluence__pr0_cong_delta -pr0_confluence__pr0_cong_upsilon_cong -pr0_confluence__pr0_cong_upsilon_delta -pr0_confluence__pr0_cong_upsilon_refl -pr0_confluence__pr0_cong_upsilon_zeta -pr0_confluence__pr0_delta_delta -pr0_confluence__pr0_delta_tau -pr0_confluence__pr0_upsilon_upsilon -pr0_delta -pr0_delta1 -pr0_gen_abbr -pr0_gen_abst -pr0_gen_appl -pr0_gen_cast -pr0_gen_lift -pr0_gen_lref -pr0_gen_sort -pr0_gen_void -pr0_lift -pr0_refl -pr0_subst0 -pr0_subst0_back -pr0_subst0_fwd -pr0_subst1 -pr0_subst1_back -pr0_subst1_fwd -pr0_tau -pr0_upsilon -pr0_zeta -pr1 -pr1_comp -pr1_confluence -pr1_eta -pr1_head_1 -pr1_head_2 -pr1_pr0 -pr1_refl -pr1_sing -pr1_strip -pr1_t -pr2 -pr2_cflat -pr2_change -pr2_confluence -pr2_confluence__pr2_delta_delta -pr2_confluence__pr2_free_delta -pr2_confluence__pr2_free_free -pr2_ctail -pr2_delta -pr2_delta1 -pr2_free -pr2_gen_abbr -pr2_gen_abst -pr2_gen_appl -pr2_gen_cabbr -pr2_gen_cast -pr2_gen_cbind -pr2_gen_cflat -pr2_gen_csort -pr2_gen_ctail -pr2_gen_lift -pr2_gen_lref -pr2_gen_sort -pr2_gen_void -pr2_head_1 -pr2_head_2 -pr2_lift -pr2_subst1 -pr2_thin_dx -pr3 -pr3_cflat -pr3_confluence -pr3_eta -pr3_flat -pr3_gen_abbr -pr3_gen_abst -pr3_gen_appl -pr3_gen_bind -pr3_gen_cabbr -pr3_gen_cast -pr3_gen_lift -pr3_gen_lref -pr3_gen_sort -pr3_gen_void -pr3_head_1 -pr3_head_12 -pr3_head_2 -pr3_head_21 -pr3_iso_appl_bind -pr3_iso_appls_abbr -pr3_iso_appls_appl_bind -pr3_iso_appls_beta -pr3_iso_appls_bind -pr3_iso_appls_cast -pr3_iso_beta -pr3_lift -pr3_pr0_pr2_t -pr3_pr1 -pr3_pr2 -pr3_pr2_pr2_t -pr3_pr2_pr3_t -pr3_pr3_pr3_t -pr3_refl -pr3_sing -pr3_strip -pr3_subst1 -pr3_t -pr3_thin_dx -pr3_wcpr0_t -ptrans -r -r_arith0 -r_arith1 -r_arith2 -r_arith3 -r_arith4 -r_arith5 -r_arith6 -r_arith7 -r_dis -r_minus -r_plus -r_plus_sym -r_S -s -s_arith0 -s_arith1 -sc3 -sc3_abbr -sc3_abst -sc3_appl -sc3_arity -sc3_arity_csubc -sc3_arity_gen -sc3_bind -sc3_cast -sc3_lift -sc3_lift1 -sc3_props__sc3_sn3_abst -sc3_repl -sc3_sn3 -s_inc -s_inj -s_le -s_le_gen -s_lt -s_lt_gen -s_minus -sn3 -sn3_abbr -sn3_appl_abbr -sn3_appl_appl -sn3_appl_appls -sn3_appl_beta -sn3_appl_bind -sn3_appl_cast -sn3_appl_lref -sn3_appls_abbr -sn3_appls_beta -sn3_appls_bind -sn3_appls_cast -sn3_appls_lref -sn3_beta -sn3_bind -sn3_cast -sn3_cdelta -sn3_cflat -sn3_change -sn3_cpr3_trans -sn3_gen_bind -sn3_gen_cflat -sn3_gen_def -sn3_gen_flat -sn3_gen_head -sn3_gen_lift -sn3_lift -sn3_nf2 -sn3_pr2_intro -sn3_pr3_trans -sn3_shift -sn3_sing -sns3 -sns3_lifts -sns3_lifts1 -s_plus -s_plus_sym -s_r -s_S -sty0 -sty0_abbr -sty0_abst -sty0_appl -sty0_bind -sty0_cast -sty0_correct -sty0_gen_appl -sty0_gen_bind -sty0_gen_cast -sty0_gen_lref -sty0_gen_sort -sty0_lift -sty0_sort -sty1 -sty1_abbr -sty1_appl -sty1_bind -sty1_cast2 -sty1_cnt -sty1_correct -sty1_lift -sty1_sing -sty1_sty0 -sty1_trans -subst -subst0 -subst0_both -subst0_confluence_eq -subst0_confluence_lift -subst0_confluence_neq -subst0_fst -subst0_gen_head -subst0_gen_lift_false -subst0_gen_lift_ge -subst0_gen_lift_lt -subst0_gen_lift_rev_ge -subst0_gen_lref -subst0_gen_sort -subst0_lift_ge -subst0_lift_ge_s -subst0_lift_ge_S -subst0_lift_lt -subst0_lref -subst0_refl -subst0_snd -subst0_subst0 -subst0_subst0_back -subst0_tlt -subst0_tlt_head -subst0_trans -subst0_weight_le -subst0_weight_lt -subst1 -subst1_confluence_eq -subst1_confluence_lift -subst1_confluence_neq -subst1_ex -subst1_gen_head -subst1_gen_lift_eq -subst1_gen_lift_ge -subst1_gen_lift_lt -subst1_gen_lref -subst1_gen_sort -subst1_head -subst1_lift_ge -subst1_lift_lt -subst1_lift_S -subst1_refl -subst1_single -subst1_subst1 -subst1_subst1_back -subst1_trans -subst_head -subst_lift_SO -subst_lref_eq -subst_lref_gt -subst_lref_lt -subst_sort -subst_subst0 -T -TApp -TCons -tcons_tapp_ex -term_dec -terms_props__bind_dec -terms_props__flat_dec -terms_props__kind_dec -THead -THeads -theads_tapp -thead_x_lift_y_y -thead_x_y_y -tle -tle_r -TList -tlist_ind_rev -TLRef -tlt -tlt_head_dx -tlt_head_sx -tlt_trans -tlt_wf_ind -tlt_wf__q_ind -TNil -trans -tslen -tslt -tslt_wf_ind -tslt_wf__q_ind -TSort -tweight -tweight_lt -ty3 -ty3_abbr -ty3_abst -ty3_acyclic -ty3_appl -ty3_arity -ty3_bind -ty3_cast -ty3_conv -ty3_correct -ty3_cred_pr2 -ty3_cred_pr3 -ty3_csubst0 -ty3_fsubst0 -ty3_gen_abst_abst -ty3_gen_appl -ty3_gen_appl_nf2 -ty3_gen_bind -ty3_gen_cabbr -ty3_gen_cast -ty3_gen_cvoid -ty3_gen_lift -ty3_gen_lref -ty3_gen_sort -ty3_getl_subst0 -ty3_inference -ty3_inv_appls_lref_nf2 -ty3_inv_lref_lref_nf2 -ty3_inv_lref_nf2 -ty3_inv_lref_nf2_pc3 -ty3_lift -ty3_nf2_gen__ty3_nf2_inv_abst_aux -ty3_nf2_inv_abst -ty3_nf2_inv_abst_premise -ty3_nf2_inv_abst_premise_csort -ty3_nf2_inv_all -ty3_nf2_inv_sort -ty3_predicative -ty3_repellent -ty3_sconv -ty3_sconv_pc3 -ty3_shift1 -ty3_sn3 -ty3_sort -ty3_sred_back -ty3_sred_pr0 -ty3_sred_pr1 -ty3_sred_pr2 -ty3_sred_pr3 -ty3_sred_wcpr0_pr0 -ty3_sty0 -ty3_subst0 -ty3_tred -ty3_typecheck -ty3_unique -tys3 -tys3_cons -tys3_gen_cons -tys3_gen_nil -tys3_nil -Void -wadd -wadd_le -wadd_lt -wadd_O -wcpr0 -wcpr0_comp -wcpr0_drop -wcpr0_drop_back -wcpr0_gen_head -wcpr0_gen_sort -wcpr0_getl -wcpr0_getl_back -wcpr0_refl -weight -weight_add_O -weight_add_S -weight_eq -weight_le -weight_map -wf3 -wf3_bind -wf3_clear_conf -wf3_flat -wf3_gen_bind1 -wf3_gen_flat1 -wf3_gen_head2 -wf3_gen_sort1 -wf3_getl_conf -wf3_idem -wf3_mono -wf3_pc3_conf -wf3_pr2_conf -wf3_pr3_conf -wf3_sort -wf3_total -wf3_ty3 -wf3_ty3_conf -wf3_void +"A" +"Abbr" +"Abst" +"abst_dec" +"AHead" +"ahead_inj_snd" +"aplus" +"aplus_ahead_simpl" +"aplus_asort_le_simpl" +"aplus_asort_O_simpl" +"aplus_asort_simpl" +"aplus_assoc" +"aplus_asucc" +"aplus_asucc_false" +"aplus_gz_ge" +"aplus_gz_le" +"aplus_inj" +"aplus_reg_r" +"aplus_sort_O_S_simpl" +"aplus_sort_S_S_simpl" +"app1" +"Appl" +"aprem" +"aprem_asucc" +"aprem_gen_head_O" +"aprem_gen_head_S" +"aprem_gen_sort" +"aprem_repl" +"aprem_succ" +"aprem_zero" +"arity" +"arity_abbr" +"arity_abst" +"arity_appl" +"arity_appls_abbr" +"arity_appls_appl" +"arity_appls_bind" +"arity_appls_cast" +"arity_aprem" +"arity_bind" +"arity_cast" +"arity_cimp_conf" +"arity_fsubst0" +"arity_gen_abst" +"arity_gen_appl" +"arity_gen_appls" +"arity_gen_bind" +"arity_gen_cast" +"arity_gen_cvoid" +"arity_gen_cvoid_subst0" +"arity_gen_lift" +"arity_gen_lref" +"arity_gen_sort" +"arity_head" +"arity_lift" +"arity_lift1" +"arity_mono" +"arity_nf2_inv_all" +"arity_repellent" +"arity_repl" +"arity_sort" +"arity_sred_pr2" +"arity_sred_pr3" +"arity_sred_wcpr0_pr0" +"arity_sred_wcpr0_pr1" +"arity_subst0" +"ASort" +"asucc" +"asucc_gen_head" +"asucc_gen_sort" +"asucc_inj" +"asucc_repl" +"B" +"Bind" +"bind_dec_not" +"binder_dec" +"C" +"Cast" +"cbk" +"CHead" +"chead_ctail" +"cimp" +"cimp_bind" +"cimp_flat_dx" +"cimp_flat_sx" +"cimp_getl_conf" +"cle" +"clear" +"clear_bind" +"clear_cle" +"clear_clear" +"clear_ctail" +"clear_flat" +"clear_gen_all" +"clear_gen_bind" +"clear_gen_flat" +"clear_gen_flat_r" +"clear_gen_sort" +"clear_getl_trans" +"clear_mono" +"clear_pc3_trans" +"clear_pr2_trans" +"clear_pr3_trans" +"clear_trans" +"clear_wf3_trans" +"cle_flt_trans" +"cle_head" +"clen" +"cle_r" +"cle_trans_head" +"clt" +"clt_cong" +"clt_head" +"clt_thead" +"clt_wf_ind" +"clt_wf__q_ind" +"cnt" +"cnt_head" +"cnt_lift" +"cnt_sort" +"CSort" +"csuba" +"csuba_abst" +"csuba_arity" +"csuba_arity_rev" +"csuba_clear_conf" +"csuba_clear_trans" +"csuba_drop_abbr" +"csuba_drop_abbr_rev" +"csuba_drop_abst" +"csuba_drop_abst_rev" +"csuba_gen_abbr" +"csuba_gen_abbr_rev" +"csuba_gen_abst" +"csuba_gen_abst_rev" +"csuba_gen_bind" +"csuba_gen_bind_rev" +"csuba_gen_flat" +"csuba_gen_flat_rev" +"csuba_gen_void" +"csuba_gen_void_rev" +"csuba_getl_abbr" +"csuba_getl_abbr_rev" +"csuba_getl_abst" +"csuba_getl_abst_rev" +"csuba_head" +"csuba_refl" +"csuba_sort" +"csuba_void" +"csubc" +"csubc_abst" +"csubc_arity_conf" +"csubc_arity_trans" +"csubc_clear_conf" +"csubc_csuba" +"csubc_drop1_conf_rev" +"csubc_drop_conf_O" +"csubc_drop_conf_rev" +"csubc_gen_head_l" +"csubc_gen_head_r" +"csubc_gen_sort_l" +"csubc_gen_sort_r" +"csubc_getl_conf" +"csubc_head" +"csubc_refl" +"csubc_sort" +"csubc_void" +"csubst0" +"csubst0_both" +"csubst0_both_bind" +"csubst0_clear_O" +"csubst0_clear_O_back" +"csubst0_clear_S" +"csubst0_clear_trans" +"csubst0_drop_eq" +"csubst0_drop_eq_back" +"csubst0_drop_gt" +"csubst0_drop_gt_back" +"csubst0_drop_lt" +"csubst0_drop_lt_back" +"csubst0_fst" +"csubst0_fst_bind" +"csubst0_gen_head" +"csubst0_gen_S_bind_2" +"csubst0_gen_sort" +"csubst0_getl_ge" +"csubst0_getl_ge_back" +"csubst0_getl_lt" +"csubst0_getl_lt_back" +"csubst0_snd" +"csubst0_snd_bind" +"csubst1" +"csubst1_bind" +"csubst1_flat" +"csubst1_gen_head" +"csubst1_getl_ge" +"csubst1_getl_ge_back" +"csubst1_getl_lt" +"csubst1_head" +"csubst1_refl" +"csubst1_sing" +"csubt" +"csubt_abst" +"csubt_clear_conf" +"csubt_csuba" +"csubt_drop_abbr" +"csubt_drop_abst" +"csubt_drop_flat" +"csubt_gen_abbr" +"csubt_gen_abst" +"csubt_gen_bind" +"csubt_gen_flat" +"csubt_getl_abbr" +"csubt_getl_abst" +"csubt_head" +"csubt_pc3" +"csubt_pr2" +"csubt_refl" +"csubt_sort" +"csubt_ty3" +"csubt_ty3_ld" +"csubt_void" +"csubv" +"csubv_bind" +"csubv_bind_same" +"csubv_clear_conf" +"csubv_clear_conf_void" +"csubv_drop_conf" +"csubv_flat" +"csubv_getl_conf" +"csubv_getl_conf_void" +"csubv_refl" +"csubv_sort" +"csubv_void" +"CTail" +"c_tail_ind" +"cweight" +"dnf_dec" +"dnf_dec2" +"drop" +"drop1" +"drop1_cons" +"drop1_cons_tail" +"drop1_csubc_trans" +"drop1_gen_pcons" +"drop1_gen_pnil" +"drop1_getl_trans" +"drop1_nil" +"drop1_skip_bind" +"drop1_trans" +"drop_clear" +"drop_clear_O" +"drop_clear_S" +"drop_conf_ge" +"drop_conf_lt" +"drop_conf_rev" +"drop_csubc_trans" +"drop_ctail" +"drop_drop" +"drop_gen_drop" +"drop_gen_refl" +"drop_gen_skip_l" +"drop_gen_skip_r" +"drop_gen_sort" +"drop_getl_trans_ge" +"drop_getl_trans_le" +"drop_getl_trans_lt" +"drop_mono" +"drop_refl" +"drop_S" +"drop_skip" +"drop_skip_bind" +"drop_skip_flat" +"drop_trans_ge" +"drop_trans_le" +"ex1_arity" +"ex1_c" +"ex1__leq_sort_SS" +"ex1_t" +"ex1_ty3" +"ex2_arity" +"ex2_c" +"ex2_nf2" +"ex2_t" +"F" +"Flat" +"flt" +"flt_arith0" +"flt_arith1" +"flt_arith2" +"flt_shift" +"flt_thead_dx" +"flt_thead_sx" +"flt_trans" +"flt_wf_ind" +"flt_wf__q_ind" +"fsubst0" +"fsubst0_both" +"fsubst0_fst" +"fsubst0_gen_base" +"fsubst0_snd" +"fweight" +"G" +"getl" +"getl_clear_bind" +"getl_clear_conf" +"getl_clear_trans" +"getl_conf_ge_drop" +"getl_conf_le" +"getl_csubst1" +"getl_ctail" +"getl_ctail_clen" +"getl_dec" +"getl_drop" +"getl_drop_conf_ge" +"getl_drop_conf_lt" +"getl_drop_conf_rev" +"getl_drop_trans" +"getl_flat" +"getl_flt" +"getl_gen_2" +"getl_gen_all" +"getl_gen_bind" +"getl_gen_flat" +"getl_gen_O" +"getl_gen_S" +"getl_gen_sort" +"getl_gen_tail" +"getl_head" +"getl_intro" +"getl_mono" +"getl_refl" +"getl_trans" +"getl_wf3_trans" +"gz" +"iso" +"iso_flats_flat_bind_false" +"iso_flats_lref_bind_false" +"iso_gen_head" +"iso_gen_lref" +"iso_gen_sort" +"iso_head" +"iso_lref" +"iso_refl" +"iso_sort" +"iso_trans" +"K" +"leq" +"leq_ahead_asucc_false" +"leq_ahead_false_1" +"leq_ahead_false_2" +"leq_asucc" +"leq_asucc_false" +"leq_eq" +"leq_gen_head1" +"leq_gen_head2" +"leq_gen_sort1" +"leq_gen_sort2" +"leq_head" +"leq_leqz" +"leq_refl" +"leq_sort" +"leq_sym" +"leq_trans" +"leqz" +"leqz_head" +"leqz_leq" +"leqz_sort" +"lift" +"lift1" +"lift1_bind" +"lift1_cons_tail" +"lift1_flat" +"lift1_free" +"lift1_lift1" +"lift1_lref" +"lift1_sort" +"lift1_xhg" +"lift_bind" +"lift_d" +"lift_flat" +"lift_free" +"lift_free_sym" +"lift_gen_bind" +"lift_gen_flat" +"lift_gen_head" +"lift_gen_lift" +"lift_gen_lref" +"lift_gen_lref_false" +"lift_gen_lref_ge" +"lift_gen_lref_lt" +"lift_gen_sort" +"lift_head" +"lift_inj" +"lift_lref_ge" +"lift_lref_gt" +"lift_lref_lt" +"lift_r" +"lifts" +"lifts1" +"lifts1_cons" +"lifts1_flat" +"lifts1_nil" +"lifts1_xhg" +"lifts_inj" +"lift_sort" +"lifts_tapp" +"lift_tle" +"lift_tlt_dx" +"lift_weight" +"lift_weight_add" +"lift_weight_add_O" +"lift_weight_map" +"llt" +"llt_head_dx" +"llt_head_sx" +"llt_repl" +"llt_trans" +"llt_wf_ind" +"llt_wf__q_ind" +"lref_map" +"lweight" +"lweight_repl" +"minus_s_s" +"mk_G" +"next_plus" +"next_plus_assoc" +"next_plus_gz" +"next_plus_lt" +"next_plus_next" +"nf0_dec" +"nf2" +"nf2_abst" +"nf2_abst_shift" +"nf2_appl_lref" +"nf2_appls_lref" +"nf2_csort_lref" +"nf2_dec" +"nf2_gen_abbr" +"nf2_gen_abst" +"nf2_gen_beta" +"nf2_gen_cast" +"nf2_gen_flat" +"nf2_gen_lref" +"nf2_gen__nf2_gen_aux" +"nf2_gen_void" +"nf2_iso_appls_lref" +"nf2_lift" +"nf2_lift1" +"nf2_lref_abst" +"nf2_pr3_confluence" +"nf2_pr3_unfold" +"nf2_sn3" +"nf2_sort" +"nfs2" +"nfs2_tapp" +"node_inh" +"not_abbr_abst" +"not_abbr_void" +"not_abst_void" +"not_void_abst" +"pc1" +"pc1_head" +"pc1_head_1" +"pc1_head_2" +"pc1_pr0_r" +"pc1_pr0_u" +"pc1_pr0_u2" +"pc1_pr0_x" +"pc1_refl" +"pc1_s" +"pc1_t" +"pc3" +"pc3_abst_dec" +"pc3_dec" +"pc3_eta" +"pc3_fsubst0" +"pc3_gen_abst" +"pc3_gen_abst_shift" +"pc3_gen_appls_lref_abst" +"pc3_gen_appls_lref_sort" +"pc3_gen_appls_sort_abst" +"pc3_gen_cabbr" +"pc3_gen_lift" +"pc3_gen_lift_abst" +"pc3_gen_not_abst" +"pc3_gen_sort" +"pc3_gen_sort_abst" +"pc3_head_1" +"pc3_head_12" +"pc3_head_2" +"pc3_head_21" +"pc3_ind_left" +"pc3_ind_left__pc3_left_pc3" +"pc3_ind_left__pc3_left_pr3" +"pc3_ind_left__pc3_left_sym" +"pc3_ind_left__pc3_left_trans" +"pc3_ind_left__pc3_pc3_left" +"pc3_left" +"pc3_left_r" +"pc3_left_ur" +"pc3_left_ux" +"pc3_lift" +"pc3_nf2" +"pc3_nf2_unfold" +"pc3_pc1" +"pc3_pr0_pr2_t" +"pc3_pr2_fsubst0" +"pc3_pr2_fsubst0_back" +"pc3_pr2_pr2_t" +"pc3_pr2_pr3_t" +"pc3_pr2_r" +"pc3_pr2_u" +"pc3_pr2_u2" +"pc3_pr2_x" +"pc3_pr3_conf" +"pc3_pr3_pc3_t" +"pc3_pr3_r" +"pc3_pr3_t" +"pc3_pr3_x" +"pc3_refl" +"pc3_s" +"pc3_t" +"pc3_thin_dx" +"pc3_wcpr0" +"pc3_wcpr0__pc3_wcpr0_t_aux" +"pc3_wcpr0_t" +"pr0" +"pr0_beta" +"pr0_comp" +"pr0_confluence" +"pr0_confluence__pr0_cong_delta" +"pr0_confluence__pr0_cong_upsilon_cong" +"pr0_confluence__pr0_cong_upsilon_delta" +"pr0_confluence__pr0_cong_upsilon_refl" +"pr0_confluence__pr0_cong_upsilon_zeta" +"pr0_confluence__pr0_delta_delta" +"pr0_confluence__pr0_delta_tau" +"pr0_confluence__pr0_upsilon_upsilon" +"pr0_delta" +"pr0_delta1" +"pr0_gen_abbr" +"pr0_gen_abst" +"pr0_gen_appl" +"pr0_gen_cast" +"pr0_gen_lift" +"pr0_gen_lref" +"pr0_gen_sort" +"pr0_gen_void" +"pr0_lift" +"pr0_refl" +"pr0_subst0" +"pr0_subst0_back" +"pr0_subst0_fwd" +"pr0_subst1" +"pr0_subst1_back" +"pr0_subst1_fwd" +"pr0_tau" +"pr0_upsilon" +"pr0_zeta" +"pr1" +"pr1_comp" +"pr1_confluence" +"pr1_eta" +"pr1_head_1" +"pr1_head_2" +"pr1_pr0" +"pr1_refl" +"pr1_sing" +"pr1_strip" +"pr1_t" +"pr2" +"pr2_cflat" +"pr2_change" +"pr2_confluence" +"pr2_confluence__pr2_delta_delta" +"pr2_confluence__pr2_free_delta" +"pr2_confluence__pr2_free_free" +"pr2_ctail" +"pr2_delta" +"pr2_delta1" +"pr2_free" +"pr2_gen_abbr" +"pr2_gen_abst" +"pr2_gen_appl" +"pr2_gen_cabbr" +"pr2_gen_cast" +"pr2_gen_cbind" +"pr2_gen_cflat" +"pr2_gen_csort" +"pr2_gen_ctail" +"pr2_gen_lift" +"pr2_gen_lref" +"pr2_gen_sort" +"pr2_gen_void" +"pr2_head_1" +"pr2_head_2" +"pr2_lift" +"pr2_subst1" +"pr2_thin_dx" +"pr3" +"pr3_cflat" +"pr3_confluence" +"pr3_eta" +"pr3_flat" +"pr3_gen_abbr" +"pr3_gen_abst" +"pr3_gen_appl" +"pr3_gen_bind" +"pr3_gen_cabbr" +"pr3_gen_cast" +"pr3_gen_lift" +"pr3_gen_lref" +"pr3_gen_sort" +"pr3_gen_void" +"pr3_head_1" +"pr3_head_12" +"pr3_head_2" +"pr3_head_21" +"pr3_iso_appl_bind" +"pr3_iso_appls_abbr" +"pr3_iso_appls_appl_bind" +"pr3_iso_appls_beta" +"pr3_iso_appls_bind" +"pr3_iso_appls_cast" +"pr3_iso_beta" +"pr3_lift" +"pr3_pr0_pr2_t" +"pr3_pr1" +"pr3_pr2" +"pr3_pr2_pr2_t" +"pr3_pr2_pr3_t" +"pr3_pr3_pr3_t" +"pr3_refl" +"pr3_sing" +"pr3_strip" +"pr3_subst1" +"pr3_t" +"pr3_thin_dx" +"pr3_wcpr0_t" +"ptrans" +"r" +"r_arith0" +"r_arith1" +"r_arith2" +"r_arith3" +"r_arith4" +"r_arith5" +"r_arith6" +"r_arith7" +"r_dis" +"r_minus" +"r_plus" +"r_plus_sym" +"r_S" +"s" +"s_arith0" +"s_arith1" +"sc3" +"sc3_abbr" +"sc3_abst" +"sc3_appl" +"sc3_arity" +"sc3_arity_csubc" +"sc3_arity_gen" +"sc3_bind" +"sc3_cast" +"sc3_lift" +"sc3_lift1" +"sc3_props__sc3_sn3_abst" +"sc3_repl" +"sc3_sn3" +"s_inc" +"s_inj" +"s_le" +"s_le_gen" +"s_lt" +"s_lt_gen" +"s_minus" +"sn3" +"sn3_abbr" +"sn3_appl_abbr" +"sn3_appl_appl" +"sn3_appl_appls" +"sn3_appl_beta" +"sn3_appl_bind" +"sn3_appl_cast" +"sn3_appl_lref" +"sn3_appls_abbr" +"sn3_appls_beta" +"sn3_appls_bind" +"sn3_appls_cast" +"sn3_appls_lref" +"sn3_beta" +"sn3_bind" +"sn3_cast" +"sn3_cdelta" +"sn3_cflat" +"sn3_change" +"sn3_cpr3_trans" +"sn3_gen_bind" +"sn3_gen_cflat" +"sn3_gen_def" +"sn3_gen_flat" +"sn3_gen_head" +"sn3_gen_lift" +"sn3_lift" +"sn3_nf2" +"sn3_pr2_intro" +"sn3_pr3_trans" +"sn3_shift" +"sn3_sing" +"sns3" +"sns3_lifts" +"sns3_lifts1" +"s_plus" +"s_plus_sym" +"s_r" +"s_S" +"sty0" +"sty0_abbr" +"sty0_abst" +"sty0_appl" +"sty0_bind" +"sty0_cast" +"sty0_correct" +"sty0_gen_appl" +"sty0_gen_bind" +"sty0_gen_cast" +"sty0_gen_lref" +"sty0_gen_sort" +"sty0_lift" +"sty0_sort" +"sty1" +"sty1_abbr" +"sty1_appl" +"sty1_bind" +"sty1_cast2" +"sty1_cnt" +"sty1_correct" +"sty1_lift" +"sty1_sing" +"sty1_sty0" +"sty1_trans" +"subst" +"subst0" +"subst0_both" +"subst0_confluence_eq" +"subst0_confluence_lift" +"subst0_confluence_neq" +"subst0_fst" +"subst0_gen_head" +"subst0_gen_lift_false" +"subst0_gen_lift_ge" +"subst0_gen_lift_lt" +"subst0_gen_lift_rev_ge" +"subst0_gen_lref" +"subst0_gen_sort" +"subst0_lift_ge" +"subst0_lift_ge_s" +"subst0_lift_ge_S" +"subst0_lift_lt" +"subst0_lref" +"subst0_refl" +"subst0_snd" +"subst0_subst0" +"subst0_subst0_back" +"subst0_tlt" +"subst0_tlt_head" +"subst0_trans" +"subst0_weight_le" +"subst0_weight_lt" +"subst1" +"subst1_confluence_eq" +"subst1_confluence_lift" +"subst1_confluence_neq" +"subst1_ex" +"subst1_gen_head" +"subst1_gen_lift_eq" +"subst1_gen_lift_ge" +"subst1_gen_lift_lt" +"subst1_gen_lref" +"subst1_gen_sort" +"subst1_head" +"subst1_lift_ge" +"subst1_lift_lt" +"subst1_lift_S" +"subst1_refl" +"subst1_single" +"subst1_subst1" +"subst1_subst1_back" +"subst1_trans" +"subst_head" +"subst_lift_SO" +"subst_lref_eq" +"subst_lref_gt" +"subst_lref_lt" +"subst_sort" +"subst_subst0" +"T" +"TApp" +"TCons" +"tcons_tapp_ex" +"term_dec" +"terms_props__bind_dec" +"terms_props__flat_dec" +"terms_props__kind_dec" +"THead" +"THeads" +"theads_tapp" +"thead_x_lift_y_y" +"thead_x_y_y" +"tle" +"tle_r" +"TList" +"tlist_ind_rev" +"TLRef" +"tlt" +"tlt_head_dx" +"tlt_head_sx" +"tlt_trans" +"tlt_wf_ind" +"tlt_wf__q_ind" +"TNil" +"trans" +"tslen" +"tslt" +"tslt_wf_ind" +"tslt_wf__q_ind" +"TSort" +"tweight" +"tweight_lt" +"ty3" +"ty3_abbr" +"ty3_abst" +"ty3_acyclic" +"ty3_appl" +"ty3_arity" +"ty3_bind" +"ty3_cast" +"ty3_conv" +"ty3_correct" +"ty3_cred_pr2" +"ty3_cred_pr3" +"ty3_csubst0" +"ty3_fsubst0" +"ty3_gen_abst_abst" +"ty3_gen_appl" +"ty3_gen_appl_nf2" +"ty3_gen_bind" +"ty3_gen_cabbr" +"ty3_gen_cast" +"ty3_gen_cvoid" +"ty3_gen_lift" +"ty3_gen_lref" +"ty3_gen_sort" +"ty3_getl_subst0" +"ty3_inference" +"ty3_inv_appls_lref_nf2" +"ty3_inv_lref_lref_nf2" +"ty3_inv_lref_nf2" +"ty3_inv_lref_nf2_pc3" +"ty3_lift" +"ty3_nf2_gen__ty3_nf2_inv_abst_aux" +"ty3_nf2_inv_abst" +"ty3_nf2_inv_abst_premise" +"ty3_nf2_inv_abst_premise_csort" +"ty3_nf2_inv_all" +"ty3_nf2_inv_sort" +"ty3_predicative" +"ty3_repellent" +"ty3_sconv" +"ty3_sconv_pc3" +"ty3_shift1" +"ty3_sn3" +"ty3_sort" +"ty3_sred_back" +"ty3_sred_pr0" +"ty3_sred_pr1" +"ty3_sred_pr2" +"ty3_sred_pr3" +"ty3_sred_wcpr0_pr0" +"ty3_sty0" +"ty3_subst0" +"ty3_tred" +"ty3_typecheck" +"ty3_unique" +"tys3" +"tys3_cons" +"tys3_gen_cons" +"tys3_gen_nil" +"tys3_nil" +"Void" +"wadd" +"wadd_le" +"wadd_lt" +"wadd_O" +"wcpr0" +"wcpr0_comp" +"wcpr0_drop" +"wcpr0_drop_back" +"wcpr0_gen_head" +"wcpr0_gen_sort" +"wcpr0_getl" +"wcpr0_getl_back" +"wcpr0_refl" +"weight" +"weight_add_O" +"weight_add_S" +"weight_eq" +"weight_le" +"weight_map" +"wf3" +"wf3_bind" +"wf3_clear_conf" +"wf3_flat" +"wf3_gen_bind1" +"wf3_gen_flat1" +"wf3_gen_head2" +"wf3_gen_sort1" +"wf3_getl_conf" +"wf3_idem" +"wf3_mono" +"wf3_pc3_conf" +"wf3_pr2_conf" +"wf3_pr3_conf" +"wf3_sort" +"wf3_total" +"wf3_ty3" +"wf3_ty3_conf" +"wf3_void" diff --git a/matita/matita/contribs/lambdadelta/basic_2/names.txt b/matita/matita/contribs/lambdadelta/basic_2/names.txt index 852ff574b..b0dd49768 100644 --- a/matita/matita/contribs/lambdadelta/basic_2/names.txt +++ b/matita/matita/contribs/lambdadelta/basic_2/names.txt @@ -1,1207 +1,1207 @@ -aaa_cpm_SO -aaa_csx -aaa_fsb -aaa_ind_csx -aaa_ind_csx_aux -aaa_ind_csx_cpxs -aaa_ind_csx_cpxs_aux -aaa_ind_fpb -aaa_ind_fpb_aux -aaa_ind_fpbg -aaa_ind_fpbg_aux -cnr -cnr_abbr_neg -cnr_abst -cnr_appl_simple -cnr_dec_teqx -cnr_gref -cnr_inv_abbr_neg -cnr_inv_abst -cnr_inv_appl -cnr_inv_cast -cnr_inv_lifts -cnr_inv_lref_abbr -cnr_lifts -cnr_lref_abst -cnr_lref_atom -cnr_lref_unit -cnr_sort -cnuw -cnuw_abbr_neg -cnuw_abst -cnuw_appl_simple -cnuw_atom_drops -cnuw_cpms_trans -cnuw_ctop -cnuw_dec -cnuw_dec_ex -cnuw_fwd_appl -cnuw_gref -cnuw_inv_abbr_pos -cnuw_inv_cast -cnuw_inv_lifts -cnuw_inv_zero_pair -cnuw_lifts -cnuw_lref -cnuw_sort -cnuw_unit_drops -cnuw_zero_unit -cnv -cnv_acle_omega -cnv_acle_one -cnv_acle_trans -cnv_appl -cnv_appl_cpes -cnv_appl_cpts -cnv_appl_ge -cnv_appl_ntas_ge -cnv_bind -cnv_cast -cnv_cast_cpes -cnv_cast_cpts -cnv_cpcs_dec -cnv_cpes_dec -cnv_cpm_conf_lpr_appl_appl_aux -cnv_cpm_conf_lpr_appl_beta_aux -cnv_cpm_conf_lpr_appl_theta_aux -cnv_cpm_conf_lpr_atom_atom_aux -cnv_cpm_conf_lpr_atom_delta_aux -cnv_cpm_conf_lpr_atom_ell_aux -cnv_cpm_conf_lpr_atom_ess_aux -cnv_cpm_conf_lpr_aux -cnv_cpm_conf_lpr_beta_beta_aux -cnv_cpm_conf_lpr_bind_bind_aux -cnv_cpm_conf_lpr_bind_zeta_aux -cnv_cpm_conf_lpr_cast_cast_aux -cnv_cpm_conf_lpr_cast_ee_aux -cnv_cpm_conf_lpr_cast_epsilon_aux -cnv_cpm_conf_lpr_delta_delta_aux -cnv_cpm_conf_lpr_delta_ell_aux -cnv_cpm_conf_lpr_ee_ee_aux -cnv_cpm_conf_lpr_epsilon_ee_aux -cnv_cpm_conf_lpr_epsilon_epsilon_aux -cnv_cpm_conf_lpr_sub -cnv_cpm_conf_lpr_theta_theta_aux -cnv_cpm_conf_lpr_zeta_zeta_aux -cnv_cpmre_cpms_conf -cnv_cpmre_mono -cnv_cpmre_trans -cnv_cpms_conf -cnv_cpms_conf_eq -cnv_cpms_conf_lpr -cnv_cpms_conf_lpr_aux -cnv_cpms_conf_lpr_refl_tneqx_sub -cnv_cpms_conf_lpr_step_tneqx_sub -cnv_cpms_conf_lpr_teqx_teqx_aux -cnv_cpms_conf_lpr_teqx_tneqx_aux -cnv_cpms_conf_lpr_tneqx_tneqx_aux -cnv_cpms_fwd_appl_sn_decompose -cnv_cpms_nta -cnv_cpms_ntas -cnv_cpms_strip_lpr_sub -cnv_cpms_teqx_conf_lpr_aux -cnv_cpms_teqx_strip_lpr_aux -cnv_cpms_trans -cnv_cpms_trans_lpr -cnv_cpms_trans_lpr_sub -cnv_cpm_teqx_conf_lpr -cnv_cpm_teqx_conf_lpr_appl_appl_aux -cnv_cpm_teqx_conf_lpr_atom_atom_aux -cnv_cpm_teqx_conf_lpr_atom_ess_aux -cnv_cpm_teqx_conf_lpr_aux -cnv_cpm_teqx_conf_lpr_bind_bind_aux -cnv_cpm_teqx_conf_lpr_cast_cast_aux -cnv_cpm_teqx_cpm_trans_aux -cnv_cpm_teqx_cpm_trans_sub -cnv_cpm_trans -cnv_cpm_trans_lpr -cnv_cpm_trans_lpr_aux -cnv_cpmuwe_mono -cnv_cpmuwe_trans -cnv_cpr_teqx_fwd_refl -cnv_dec -cnv_fpbg_refl_false -cnv_fqu_conf -cnv_fqup_conf -cnv_fquq_conf -cnv_fqus_conf -cnv_fwd_aaa -cnv_fwd_cpms_abst_dx_le -cnv_fwd_cpm_SO -cnv_fwd_cpms_total -cnv_fwd_csx -cnv_fwd_flat -cnv_fwd_fsb -cnv_fwd_pair_sn -cnv_ind_cpes -cnv_inv_appl -cnv_inv_appl_aux -cnv_inv_appl_cpes -cnv_inv_appl_cpts -cnv_inv_appl_ntas -cnv_inv_bind -cnv_inv_bind_aux -cnv_inv_cast -cnv_inv_cast_aux -cnv_inv_cast_cpes -cnv_inv_cast_cpts -cnv_inv_gref -cnv_inv_gref_aux -cnv_inv_lifts -cnv_inv_lref -cnv_inv_lref_atom -cnv_inv_lref_aux -cnv_inv_lref_drops -cnv_inv_lref_pair -cnv_inv_lref_unit -cnv_inv_zero -cnv_inv_zero_aux -cnv_lifts -cnv_lprs_trans -cnv_lpr_trans -cnv_lref -cnv_lref_drops -cnv_nta_sn -cnv_preserve -cnv_R_cpmuwe_dec -cnv_R_cpmuwe_total -cnv_sort -cnv_zero -cnx -cnx_abst -cnx_appl_simple -cnx_csx -cnx_inv_abbr_neg -cnx_inv_abbr_pos -cnx_inv_abst -cnx_inv_appl -cnx_inv_cast -cnx_inv_lifts -cnx_inv_lref_pair -cnx_lifts -cnx_lref_atom -cnx_lref_unit -cnx_sort -cnx_teqx_trans -cpc -cpc_conf -cpc_cpcs -cpc_fwd_cpr -cpc_refl -cpcs -cpcs_aaa_mono -cpcs_bind1 -cpcs_bind2 -cpcs_bind_dx -cpcs_bind_sn -cpcs_canc_dx -cpcs_canc_sn -cpcs_cpr_conf -cpcs_cpr_div -cpcs_cprs_conf -cpcs_cprs_div -cpcs_cprs_dx -cpcs_cprs_sn -cpcs_cprs_step_dx -cpcs_cprs_step_sn -cpcs_cpr_step_dx -cpcs_cpr_step_sn -cpcs_flat -cpcs_flat_dx_cpr_rev -cpcs_ind_dx -cpcs_ind_sn -cpcs_inv_abst_bi_dx -cpcs_inv_abst_bi_sn -cpcs_inv_abst_dx -cpcs_inv_abst_sn -cpcs_inv_cprs -cpcs_inv_lifts_bi -cpcs_inv_sort_abst -cpcs_inv_sort_bi -cpcs_lifts_bi -cpcs_refl -cpcs_step_dx -cpcs_step_sn -cpcs_strip -cpcs_sym -cpcs_trans -cpc_sym -cpes -cpes_aaa_mono -cpes_cpes_trans -cpes_cpms_div -cpes_cprs_trans -cpes_fwd_abst_bi -cpes_refl -cpes_refl_aaa -cpes_sym -cpg -cpg_appl -cpg_atom -cpg_beta -cpg_bind -cpg_cast -cpg_cpx -cpg_delta -cpg_delta_drops -cpg_ee -cpg_ell -cpg_ell_drops -cpg_eps -cpg_ess -cpg_fwd_bind1_minus -cpg_inv_abbr1 -cpg_inv_abst1 -cpg_inv_appl1 -cpg_inv_appl1_aux -cpg_inv_appl1_simple -cpg_inv_atom1 -cpg_inv_atom1_aux -cpg_inv_atom1_drops -cpg_inv_bind1 -cpg_inv_bind1_aux -cpg_inv_cast1 -cpg_inv_cast1_aux -cpg_inv_gref1 -cpg_inv_lifts_bi -cpg_inv_lifts_sn -cpg_inv_lref1 -cpg_inv_lref1_bind -cpg_inv_lref1_drops -cpg_inv_sort1 -cpg_inv_zero1 -cpg_inv_zero1_pair -cpg_lifts_bi -cpg_lifts_sn -cpg_lref -cpg_refl -cpg_theta -cpg_zeta -cpm -cpm_aaa_conf -cpm_appl -cpm_beta -cpm_bind -cpm_bind2 -cpm_bind_unit -cpm_cast -cpm_cpms -cpm_delta -cpm_delta_drops -cpm_ee -cpm_ell -cpm_ell_drops -cpm_eps -cpm_ess -cpm_fpb -cpm_fpbq -cpm_fsge_comp -cpm_fwd_bind1_minus -cpm_fwd_cpx -cpm_fwd_plus -cpm_fwd_plus_aux -cpm_ind -cpm_inv_abbr1 -cpm_inv_abst1 -cpm_inv_abst_bi -cpm_inv_appl1 -cpm_inv_appl1_simple -cpm_inv_atom1 -cpm_inv_atom1_drops -cpm_inv_bind1 -cpm_inv_cast1 -cpm_inv_gref1 -cpm_inv_lifts_bi -cpm_inv_lifts_sn -cpm_inv_lref1 -cpm_inv_lref1_ctop -cpm_inv_lref1_drops -cpm_inv_sort1 -cpm_inv_zero1 -cpm_inv_zero1_unit -cpm_lifts_bi -cpm_lifts_sn -cpm_lref -cpmre -cpmre_fwd_cpms -cpmre_intro -cpmre_total_aaa -cpm_rex_conf -cpms -cpms_aaa_conf -cpms_abst_dx_le_aaa -cpms_appl -cpms_appl_dx -cpms_beta -cpms_beta_dx -cpms_beta_rc -cpms_bind -cpms_bind2_dx -cpms_bind_alt -cpms_bind_dx -cpms_cast -cpms_cast_sn -cpms_cprre_trans -cpms_cprs_trans -cpms_delta -cpms_delta_drops -cpms_div -cpms_ee -cpms_ell -cpms_ell_drops -cpms_eps -cpms_fpbg_trans -cpms_fwd_cpxs -cpms_fwd_fpbs -cpms_ind_dx -cpms_ind_sn -cpms_inv_abbr_abst -cpms_inv_abbr_sn_dx -cpms_inv_abst_bi -cpms_inv_abst_sn -cpms_inv_abst_sn_cprs -cpms_inv_appl_sn -cpms_inv_cast1 -cpms_inv_delta_sn -cpms_inv_ell_sn -cpms_inv_gref1 -cpms_inv_lifts_bi -cpms_inv_lifts_sn -cpms_inv_lref1_ctop -cpms_inv_lref1_drops -cpms_inv_lref_sn -cpms_inv_plus -cpms_inv_sort1 -cpms_inv_succ_sn -cpms_inv_zero1_unit -cpms_lifts_bi -cpms_lifts_sn -cpms_lref -cpm_sort -cpms_reqx_conf_dx -cpms_reqx_conf_sn -cpms_sort -cpms_step_dx -cpms_step_sn -cpms_teqx_ind_sn -cpms_theta -cpms_theta_dx -cpms_theta_rc -cpms_tneqx_fwd_fpbg -cpms_tneqx_fwd_step_sn_aux -cpms_total_aaa -cpms_trans -cpms_trans_swap -cpms_zeta -cpms_zeta_dx -cpm_teqx_free -cpm_teqx_ind -cpm_teqx_inv_appl_sn -cpm_teqx_inv_atom_sn -cpm_teqx_inv_bind_dx -cpm_teqx_inv_bind_sn -cpm_teqx_inv_bind_sn_void -cpm_teqx_inv_cast_sn -cpm_teqx_inv_lref_sn -cpm_theta -cpm_tneqx_cpm_cpms_teqx_sym_fwd_fpbg -cpm_tneqx_cpm_fpbg -cpmuwe -cpmuwe_abbr_neg -cpmuwe_abst -cpmuwe_ctop -cpmuwe_fwd_cpms -cpmuwe_gref -cpmuwe_intro -cpmuwe_sort -cpmuwe_total_csx -cpmuwe_zero_unit -cpm_zeta -cpr_abbr_pos_tneqx -cpr_conf -cpr_conf_lpr -cpr_conf_lpr_atom_atom -cpr_conf_lpr_atom_delta -cpr_conf_lpr_beta_beta -cpr_conf_lpr_bind_bind -cpr_conf_lpr_bind_zeta -cpr_conf_lpr_delta_delta -cpr_conf_lpr_eps_eps -cpr_conf_lpr_flat_beta -cpr_conf_lpr_flat_eps -cpr_conf_lpr_flat_flat -cpr_conf_lpr_flat_theta -cpr_conf_lpr_theta_theta -cpr_conf_lpr_zeta_zeta -cpr_cpcs_dx -cpr_cpcs_sn -cpr_cprs_conf_cpcs -cpr_cprs_div -cpr_div -cpr_ext -cpr_flat -cpr_ind -cpr_inv_atom1 -cpr_inv_atom1_drops -cpr_inv_cast1 -cpr_inv_flat1 -cpr_inv_gref1 -cpr_inv_lref1 -cpr_inv_lref1_drops -cpr_inv_sort1 -cpr_inv_zero1 -cpr_pair_sn -cprre_cprs_conf -cpr_refl -cprre_mono -cprre_total_csx -cprs_abbr_pos_twneq -cprs_conf -cprs_conf_cpcs -cprs_cpr_conf_cpcs -cprs_cpr_div -cprs_CTC -cprs_div -cprs_ext -cprs_flat -cprs_flat_dx -cprs_flat_sn -cprs_ind_dx -cprs_ind_sn -cprs_inv_appl_sn -cprs_inv_cast1 -cprs_inv_cnr_sn -cprs_inv_CTC -cprs_inv_lref1_drops -cprs_inv_sort1 -cprs_lpr_conf_dx -cprs_lpr_conf_sn -cprs_nta_trans -cprs_nta_trans_cnv -cprs_refl -cprs_step_dx -cprs_step_sn -cprs_strip -cprs_trans -cpr_subst -cpt -cpt_appl -cpt_bind -cpt_cast -cpt_cpts -cpt_delta -cpt_delta_drops -cpt_ee -cpt_ell -cpt_ell_drops -cpt_ess -cpt_fwd_cpm -cpt_fwd_plus -cpt_fwd_plus_aux -cpt_ind -cpt_inv_appl_sn -cpt_inv_atom_sn -cpt_inv_atom_sn_drops -cpt_inv_bind_sn -cpt_inv_cast_sn -cpt_inv_gref_sn -cpt_inv_lifts_bi -cpt_inv_lifts_sn -cpt_inv_lref_sn -cpt_inv_lref_sn_ctop -cpt_inv_lref_sn_drops -cpt_inv_sort_sn -cpt_inv_zero_sn -cpt_inv_zero_sn_unit -cpt_lifts_bi -cpt_lifts_sn -cpt_lref -cpt_refl -cpts -cpts_appl_dx -cpts_bind_dx -cpts_cast_sn -cpts_cpms_conf_eq -cpts_cprs_trans -cpts_delta -cpts_delta_drops -cpts_ee -cpts_ell -cpts_ell_drops -cpts_fwd_cpms -cpts_ind_dx -cpts_ind_sn -cpts_inv_cast_sn -cpts_inv_delta_sn -cpts_inv_ell_sn -cpts_inv_gref_sn -cpts_inv_lifts_bi -cpts_inv_lifts_sn -cpts_inv_lref_sn -cpts_inv_lref_sn_ctop -cpts_inv_lref_sn_drops -cpts_inv_sort_sn -cpts_inv_succ_sn -cpts_inv_zero_sn_unit -cpts_lifts_bi -cpts_lifts_sn -cpts_lref -cpt_sort -cpts_refl -cpts_sort -cpts_step_dx -cpts_step_sn -cpts_total_aaa -cpx -cpx_aaa_conf -cpx_aaa_conf_lpx -cpx_beta -cpx_bind -cpx_bind2 -cpx_bind_unit -cpx_cpxs -cpx_delta -cpx_delta_drops -cpx_ee -cpx_eps -cpx_ess -cpx_ext -cpx_flat -cpx_fsge_comp -cpx_fwd_bind1_minus -cpx_ind -cpx_inv_abbr1 -cpx_inv_abst1 -cpx_inv_appl1 -cpx_inv_appl1_simple -cpx_inv_atom1 -cpx_inv_atom1_drops -cpx_inv_bind1 -cpx_inv_cast1 -cpx_inv_flat1 -cpx_inv_gref1 -cpx_inv_lifts_bi -cpx_inv_lifts_sn -cpx_inv_lref1 -cpx_inv_lref1_bind -cpx_inv_lref1_drops -cpx_inv_sort1 -cpx_inv_zero1 -cpx_inv_zero1_pair -cpx_lifts_bi -cpx_lifts_sn -cpx_lref -cpx_pair_sn -cpx_refl -cpx_req_conf_sn -cpx_reqx_conf -cpx_reqx_conf_dx -cpx_reqx_conf_sn -cpx_rex_conf -cpxs -cpxs_aaa_conf -cpxs_beta -cpxs_beta_dx -cpxs_beta_rc -cpxs_bind -cpxs_bind2_dx -cpxs_bind_alt -cpxs_bind_dx -cpxs_cnx -cpxs_delta -cpxs_delta_drops -cpxs_ee -cpxs_eps -cpxs_ext -cpxs_flat -cpxs_flat_dx -cpxs_flat_sn -cpxs_fpbg_trans -cpxs_fpbs -cpxs_fpbs_trans -cpxs_fqup_fpbs -cpxs_fqus_fpbs -cpxs_fqus_lpxs_fpbs -cpxs_fwd_beta -cpxs_fwd_beta_vector -cpxs_fwd_cast -cpxs_fwd_cast_vector -cpxs_fwd_cnx -cpxs_fwd_cnx_vector -cpxs_fwd_delta_drops -cpxs_fwd_delta_drops_vector -cpxs_fwd_sort -cpxs_fwd_sort_vector -cpxs_fwd_theta -cpxs_fwd_theta_vector -cpxs_ind -cpxs_ind_dx -cpxs_inv_abbr1_dx -cpxs_inv_abst1 -cpxs_inv_appl1 -cpxs_inv_cast1 -cpxs_inv_cnx1 -cpxs_inv_lifts_bi -cpxs_inv_lifts_sn -cpxs_inv_lref1 -cpxs_inv_lref1_drops -cpxs_inv_sort1 -cpxs_inv_zero1 -cpxs_lifts_bi -cpxs_lifts_sn -cpxs_lref -cpxs_pair_sn -cpxs_refl -cpxs_reqx_conf -cpxs_reqx_conf_dx -cpxs_reqx_conf_sn -cpxs_sort -cpxs_strap1 -cpxs_strap2 -cpxs_teqx_fpbs -cpxs_teqx_fpbs_trans -cpxs_theta -cpxs_theta_dx -cpxs_theta_rc -cpxs_tneqx_fpbg -cpxs_tneqx_fwd_step_sn -cpxs_trans -cpx_subst -cpxs_zeta -cpxs_zeta_dx -cpx_teqx_conf -cpx_teqx_conf_rex -cpx_theta -cpx_zeta -csx -csx_abbr -csx_abst -csx_appl_beta -csx_appl_beta_aux -csx_appl_simple -csx_appl_simple_teqo -csx_appl_theta -csx_appl_theta_aux -csx_applv_beta -csx_applv_cast -csx_applv_cnx -csx_applv_delta_drops -csx_applv_sort -csx_applv_theta -csx_bind -csx_cast -csx_cpcs_dec -csx_cpxs_trans -csx_cpx_trans -csx_feqx_conf -csx_fpbq_conf -csx_fqu_conf -csx_fqup_conf -csx_fquq_conf -csx_fqus_conf -csx_fsb -csx_fsb_fpbs -csx_fwd_applv -csx_fwd_bind -csx_fwd_bind_dx -csx_fwd_bind_dx_aux -csx_fwd_bind_dx_unit -csx_fwd_bind_dx_unit_aux -csx_fwd_bind_unit -csx_fwd_flat -csx_fwd_flat_dx -csx_fwd_flat_dx_aux -csx_fwd_pair_sn -csx_fwd_pair_sn_aux -csx_gcp -csx_gcr -csx_ind -csx_ind_cpxs -csx_ind_cpxs_teqx -csx_ind_fpb -csx_ind_fpbg -csx_intro -csx_intro_cpxs -csx_inv_lifts -csx_inv_lref_drops -csx_inv_lref_pair_drops -csx_lifts -csx_lpx_conf -csx_lpxs_conf -csx_lref_pair_drops -csx_lsubr_conf -csx_reqx_conf -csx_reqx_trans -csx_rsx -csx_sort -csx_teqx_trans -csxv -csxv_inv_cons -drops_lprs_trans -drops_lpr_trans -drops_lpxs_trans -drops_lpx_trans -feqx_cpxs_trans -feqx_cpx_trans -feqx_fpbg_trans -feqx_fpbs -feqx_fpbs_trans -feqx_fpb_trans -feqx_lpxs_trans -fleq_rpx -fpb -fpb_cpx -fpb_fpbg -fpb_fpbg_trans -fpb_fpbq -fpb_fpbq_fneqx -fpb_fpbs -fpb_fqu -fpbg -fpbg_cpms_trans -fpbg_feqx_trans -fpbg_fpbq_trans -fpbg_fpbs_trans -fpbg_fqu_trans -fpbg_fwd_fpbs -fpbg_teqx_div -fpbg_trans -fpb_inv_feqx -fpb_lpx -fpbq -fpbq_aaa_conf -fpbq_cpx -fpbq_feqx -fpbq_fneqx_inv_fpb -fpbq_fpbg_trans -fpbq_fpbs -fpbq_fquq -fpbq_inv_fpb -fpbq_lpx -fpbq_refl -fpbs -fpbs_aaa_conf -fpbs_cpxs_teqx_fqup_lpx_trans -fpbs_cpxs_trans -fpbs_cpx_tneqx_trans -fpbs_csx_conf -fpbs_feqx_trans -fpbs_fpbg_trans -fpbs_fpb_trans -fpbs_fqup_trans -fpbs_fqus_trans -fpbs_ind -fpbs_ind_dx -fpbs_intro_star -fpbs_inv_fpbg -fpbs_inv_star -fpbs_lpxs_trans -fpbs_lpx_trans -fpbs_refl -fpbs_strap1 -fpbs_strap2 -fpbs_teqx_trans -fpbs_trans -fqu_cpr_trans_dx -fqu_cpr_trans_sn -fqu_cpxs_trans -fqu_cpxs_trans_tneqx -fqu_cpx_trans -fqu_cpx_trans_tneqx -fqu_lpr_trans -fqu_lpx_trans -fqup_cpms_fwd_fpbg -fqup_cpxs_trans -fqup_cpxs_trans_tneqx -fqup_cpx_trans -fqup_cpx_trans_tneqx -fqup_fpbg -fqup_fpbg_trans -fqup_fpbs -fqup_fpbs_trans -fquq_cpr_trans_dx -fquq_cpr_trans_sn -fquq_cpxs_trans -fquq_cpxs_trans_tneqx -fquq_cpx_trans -fquq_cpx_trans_tneqx -fquq_lpr_trans -fquq_lpx_trans -fqus_cpxs_trans -fqus_cpxs_trans_tneqx -fqus_cpx_trans -fqus_cpx_trans_tneqx -fqus_fpbs -fqus_fpbs_trans -fqus_lpxs_fpbs -fsb -fsb_feqx_trans -fsb_fpbg_refl_false -fsb_fpbs_trans -fsb_ind_alt -fsb_ind_fpbg -fsb_ind_fpbg_fpbs -fsb_intro -fsb_intro_fpbg -fsb_inv_csx -IH_cnv_cpm_conf_lpr -IH_cnv_cpms_conf_lpr -IH_cnv_cpms_strip_lpr -IH_cnv_cpms_trans_lpr -IH_cnv_cpm_teqx_conf_lpr -IH_cnv_cpm_teqx_cpm_trans -IH_cnv_cpm_trans_lpr -IH_cpr_conf_lpr -jsx -jsx_atom -jsx_bind -jsx_csx_conf -jsx_fwd_bind_sn -jsx_fwd_drops_atom_sn -jsx_fwd_drops_pair_sn -jsx_fwd_drops_unit_sn -jsx_fwd_lsubr -jsx_inv_atom_sn -jsx_inv_atom_sn_aux -jsx_inv_bind_sn -jsx_inv_bind_sn_aux -jsx_inv_pair_sn -jsx_inv_void_sn -jsx_pair -jsx_refl -jsx_trans -lfsx_atom -lpr -lpr_aaa_conf -lpr_bind -lpr_bind_refl_dx -lpr_conf -lpr_cpcs_conf -lpr_cpcs_trans -lpr_cpms_trans -lpr_cpm_trans -lpr_cpr_conf -lpr_cpr_conf_dx -lpr_cpr_conf_sn -lpr_cprs_conf -lpr_cprs_trans -lpr_cpr_trans -lpr_drops_conf -lpr_drops_trans -lpr_fpb -lpr_fpbq -lpr_fquq_trans -lpr_fqu_trans -lpr_fwd_length -lpr_fwd_lpx -lpr_inv_atom_dx -lpr_inv_atom_sn -lpr_inv_bind_dx -lpr_inv_bind_sn -lpr_inv_pair -lpr_inv_pair_dx -lpr_inv_pair_sn -lpr_inv_unit_dx -lpr_inv_unit_sn -lpr_lprs -lpr_pair -lpr_refl -lprs -lprs_aaa_conf -lprs_bind_refl_dx -lprs_conf -lprs_cpcs_trans -lprs_cpms_trans -lprs_cpm_trans -lprs_cpr_conf_dx -lprs_cpr_conf_sn -lprs_cprs_conf -lprs_cprs_conf_dx -lprs_cprs_conf_sn -lprs_CTC -lprs_drops_conf -lprs_drops_trans -lprs_fwd_length -lprs_fwd_lpxs -lprs_ind -lprs_ind_dx -lprs_ind_sn -lprs_inv_atom_dx -lprs_inv_atom_sn -lprs_inv_CTC -lprs_inv_pair_dx -lprs_inv_pair_sn -lprs_inv_TC -lprs_pair -lprs_pair_dx -lprs_refl -lprs_step_dx -lprs_step_sn -lprs_strip -lprs_TC -lprs_trans -lpx -lpx_aaa_conf -lpx_bind -lpx_bind_refl_dx -lpx_cpx_conf_fsge -lpx_cpxs_trans -lpx_cpx_trans -lpx_drops_conf -lpx_drops_trans -lpx_fqup_trans -lpx_fquq_trans -lpx_fqus_trans -lpx_fqu_trans -lpx_fsge_comp -lpx_fwd_length -lpx_inv_atom_dx -lpx_inv_atom_sn -lpx_inv_bind_dx -lpx_inv_bind_sn -lpx_inv_pair -lpx_inv_pair_dx -lpx_inv_pair_sn -lpx_inv_unit_dx -lpx_inv_unit_sn -lpx_lpxs -lpx_pair -lpx_refl -lpx_rpx -lpxs -lpxs_aaa_conf -lpxs_bind_refl_dx -lpxs_cpxs_trans -lpxs_cpx_trans -lpxs_drops_conf -lpxs_drops_trans -lpxs_feqx_fpbs -lpxs_fpbs -lpxs_fpbs_trans -lpxs_fwd_length -lpxs_ind -lpxs_ind_dx -lpxs_ind_sn -lpxs_inv_atom_dx -lpxs_inv_atom_sn -lpxs_inv_bind_sn -lpxs_inv_pair_dx -lpxs_inv_pair_sn -lpxs_pair -lpxs_pair_dx -lpxs_refl -lpxs_rneqx_fpbg -lpxs_rneqx_inv_step_sn -lpxs_step_dx -lpxs_step_sn -lpxs_trans -lsubr_cpcs_trans -lsubr_cpg_trans -lsubr_cpms_trans -lsubr_cpm_trans -lsubr_cpxs_trans -lsubr_cpx_trans -lsubsv_fwd_lsuba -lsubv -lsubv_atom -lsubv_beta -lsubv_bind -lsubv_cnv_trans -lsubv_cpcs_trans -lsubv_cpms_trans -lsubv_drops_conf_isuni -lsubv_drops_trans_isuni -lsubv_fwd_lsubr -lsubv_inv_abst_sn -lsubv_inv_atom_dx -lsubv_inv_atom_dx_aux -lsubv_inv_atom_sn -lsubv_inv_atom_sn_aux -lsubv_inv_bind_dx -lsubv_inv_bind_dx_aux -lsubv_inv_bind_sn -lsubv_inv_bind_sn_aux -lsubv_refl -lsubv_trans -nta -nta_abst_predicative -nta_abst_repellent -nta_appl -nta_appl_abst -nta_appl_ntas_pos -nta_appl_ntas_zero -nta_bind_cnv -nta_cast -nta_cast_old -nta_conv -nta_conv_cnv -nta_cpcs_bi -nta_cpcs_conf -nta_cpcs_conf_cnv -nta_cpr_conf -nta_cpr_conf_lpr -nta_cprs_conf -nta_cprs_trans -nta_fwd_aaa -nta_fwd_cnv_dx -nta_fwd_cnv_sn -nta_fwd_correct -nta_fwd_fsb -nta_ind_cnv -nta_ind_ext_cnv -nta_ind_ext_cnv_mixed -nta_ind_rest_cnv -nta_inference_dec -nta_inv_abst_bi_cnv -nta_inv_appl_sn -nta_inv_appl_sn_ntas -nta_inv_bind_sn_cnv -nta_inv_cast_sn -nta_inv_cast_sn_old -nta_inv_gref_sn -nta_inv_ldec_sn_cnv -nta_inv_ldef_sn -nta_inv_lifts_sn -nta_inv_lref_sn -nta_inv_lref_sn_drops_cnv -nta_inv_pure_sn_cnv -nta_inv_sort_sn -nta_ldec_cnv -nta_ldec_drops_cnv -nta_ldef -nta_ldef_drops -nta_lifts_bi -nta_lifts_sn -nta_lpr_conf -nta_lprs_conf -nta_lref -nta_mono -nta_ntas -nta_pure_cnv -ntas -ntas_bind_cnv -ntas_fwd_cnv_dx -ntas_fwd_cnv_sn -ntas_ind_bi_nta -ntas_intro -ntas_inv_appl_sn -ntas_inv_nta -ntas_inv_plus -ntas_inv_zero -nta_sort -ntas_refl -ntas_sort -ntas_step_dx -ntas_step_sn -ntas_trans -ntas_zero -nta_typecheck -nta_typecheck_dec -R_cpmuwe -R_cpmuwe_total_csx -req_cpx_trans -reqx_cpxs_trans -reqx_cpx_trans -reqx_fpb_trans -reqx_lpxs_trans -reqx_lpx_trans -reqx_rpx_trans -rpr_fsge_comp -rpx -rpx_atom -rpx_bind -rpx_bind_dx_split -rpx_bind_dx_split_void -rpx_bind_repl_dx -rpx_bind_void -rpx_cpx_conf -rpx_cpx_conf_fsge -rpx_cpx_conf_fsge_dx -rpx_flat -rpx_flat_dx_split -rpx_fsge_comp -rpx_fwd_bind_dx -rpx_fwd_bind_dx_void -rpx_fwd_flat_dx -rpx_fwd_length -rpx_fwd_pair_sn -rpx_gref -rpx_inv_atom_dx -rpx_inv_atom_sn -rpx_inv_bind -rpx_inv_bind_void -rpx_inv_flat -rpx_inv_gref -rpx_inv_gref_bind_dx -rpx_inv_gref_bind_sn -rpx_inv_lifts_bi -rpx_inv_lifts_dx -rpx_inv_lifts_sn -rpx_inv_lpx_req -rpx_inv_lref -rpx_inv_lref_bind_dx -rpx_inv_lref_bind_sn -rpx_inv_sort -rpx_inv_sort_bind_dx -rpx_inv_sort_bind_sn -rpx_inv_zero_length -rpx_inv_zero_pair_dx -rpx_inv_zero_pair_sn -rpx_lifts_sn -rpx_lref -rpx_pair -rpx_pair_refl -rpx_pair_sn_split -rpx_refl -rpx_reqx_conf -rpx_sort -rpx_teqx_conf -rpx_teqx_div -rsx -rsx_bind -rsx_bind_lpxs_aux -rsx_bind_lpxs_void_aux -rsx_bind_void -rsx_cpxs_trans -rsx_cpx_trans -rsx_cpx_trans_jsx -rsx_flat -rsx_flat_lpxs -rsx_fwd_bind_dx_void -rsx_fwd_flat_dx -rsx_fwd_lref_pair_csx -rsx_fwd_lref_pair_csx_aux -rsx_fwd_lref_pair_csx_drops -rsx_fwd_lref_pair_drops -rsx_fwd_pair -rsx_fwd_pair_aux -rsx_fwd_pair_sn -rsx_gref -rsx_ind -rsx_ind_lpxs -rsx_ind_lpxs_reqx -rsx_intro -rsx_intro_lpxs -rsx_inv_bind_void -rsx_inv_flat -rsx_inv_lifts -rsx_inv_lref_drops -rsx_inv_lref_pair -rsx_inv_lref_pair_drops -rsx_jsx_trans -rsx_lifts -rsx_lpxs_trans -rsx_lpx_trans -rsx_lref_atom_drops -rsx_lref_pair -rsx_lref_pair_drops -rsx_lref_pair_lpxs -rsx_lref_unit_drops -rsx_reqx_trans -rsx_sort -rsx_unit -teqx_cpxs_trans -teqx_cpx_trans -teqx_fpbs_trans -teqx_fpb_trans -teqx_reqx_lpx_fpbs +"aaa_cpm_SO" +"aaa_csx" +"aaa_fsb" +"aaa_ind_csx" +"aaa_ind_csx_aux" +"aaa_ind_csx_cpxs" +"aaa_ind_csx_cpxs_aux" +"aaa_ind_fpb" +"aaa_ind_fpb_aux" +"aaa_ind_fpbg" +"aaa_ind_fpbg_aux" +"cnr" +"cnr_abbr_neg" +"cnr_abst" +"cnr_appl_simple" +"cnr_dec_teqx" +"cnr_gref" +"cnr_inv_abbr_neg" +"cnr_inv_abst" +"cnr_inv_appl" +"cnr_inv_cast" +"cnr_inv_lifts" +"cnr_inv_lref_abbr" +"cnr_lifts" +"cnr_lref_abst" +"cnr_lref_atom" +"cnr_lref_unit" +"cnr_sort" +"cnuw" +"cnuw_abbr_neg" +"cnuw_abst" +"cnuw_appl_simple" +"cnuw_atom_drops" +"cnuw_cpms_trans" +"cnuw_ctop" +"cnuw_dec" +"cnuw_dec_ex" +"cnuw_fwd_appl" +"cnuw_gref" +"cnuw_inv_abbr_pos" +"cnuw_inv_cast" +"cnuw_inv_lifts" +"cnuw_inv_zero_pair" +"cnuw_lifts" +"cnuw_lref" +"cnuw_sort" +"cnuw_unit_drops" +"cnuw_zero_unit" +"cnv" +"cnv_acle_omega" +"cnv_acle_one" +"cnv_acle_trans" +"cnv_appl" +"cnv_appl_cpes" +"cnv_appl_cpts" +"cnv_appl_ge" +"cnv_appl_ntas_ge" +"cnv_bind" +"cnv_cast" +"cnv_cast_cpes" +"cnv_cast_cpts" +"cnv_cpcs_dec" +"cnv_cpes_dec" +"cnv_cpm_conf_lpr_appl_appl_aux" +"cnv_cpm_conf_lpr_appl_beta_aux" +"cnv_cpm_conf_lpr_appl_theta_aux" +"cnv_cpm_conf_lpr_atom_atom_aux" +"cnv_cpm_conf_lpr_atom_delta_aux" +"cnv_cpm_conf_lpr_atom_ell_aux" +"cnv_cpm_conf_lpr_atom_ess_aux" +"cnv_cpm_conf_lpr_aux" +"cnv_cpm_conf_lpr_beta_beta_aux" +"cnv_cpm_conf_lpr_bind_bind_aux" +"cnv_cpm_conf_lpr_bind_zeta_aux" +"cnv_cpm_conf_lpr_cast_cast_aux" +"cnv_cpm_conf_lpr_cast_ee_aux" +"cnv_cpm_conf_lpr_cast_epsilon_aux" +"cnv_cpm_conf_lpr_delta_delta_aux" +"cnv_cpm_conf_lpr_delta_ell_aux" +"cnv_cpm_conf_lpr_ee_ee_aux" +"cnv_cpm_conf_lpr_epsilon_ee_aux" +"cnv_cpm_conf_lpr_epsilon_epsilon_aux" +"cnv_cpm_conf_lpr_sub" +"cnv_cpm_conf_lpr_theta_theta_aux" +"cnv_cpm_conf_lpr_zeta_zeta_aux" +"cnv_cpmre_cpms_conf" +"cnv_cpmre_mono" +"cnv_cpmre_trans" +"cnv_cpms_conf" +"cnv_cpms_conf_eq" +"cnv_cpms_conf_lpr" +"cnv_cpms_conf_lpr_aux" +"cnv_cpms_conf_lpr_refl_tneqx_sub" +"cnv_cpms_conf_lpr_step_tneqx_sub" +"cnv_cpms_conf_lpr_teqx_teqx_aux" +"cnv_cpms_conf_lpr_teqx_tneqx_aux" +"cnv_cpms_conf_lpr_tneqx_tneqx_aux" +"cnv_cpms_fwd_appl_sn_decompose" +"cnv_cpms_nta" +"cnv_cpms_ntas" +"cnv_cpms_strip_lpr_sub" +"cnv_cpms_teqx_conf_lpr_aux" +"cnv_cpms_teqx_strip_lpr_aux" +"cnv_cpms_trans" +"cnv_cpms_trans_lpr" +"cnv_cpms_trans_lpr_sub" +"cnv_cpm_teqx_conf_lpr" +"cnv_cpm_teqx_conf_lpr_appl_appl_aux" +"cnv_cpm_teqx_conf_lpr_atom_atom_aux" +"cnv_cpm_teqx_conf_lpr_atom_ess_aux" +"cnv_cpm_teqx_conf_lpr_aux" +"cnv_cpm_teqx_conf_lpr_bind_bind_aux" +"cnv_cpm_teqx_conf_lpr_cast_cast_aux" +"cnv_cpm_teqx_cpm_trans_aux" +"cnv_cpm_teqx_cpm_trans_sub" +"cnv_cpm_trans" +"cnv_cpm_trans_lpr" +"cnv_cpm_trans_lpr_aux" +"cnv_cpmuwe_mono" +"cnv_cpmuwe_trans" +"cnv_cpr_teqx_fwd_refl" +"cnv_dec" +"cnv_fpbg_refl_false" +"cnv_fqu_conf" +"cnv_fqup_conf" +"cnv_fquq_conf" +"cnv_fqus_conf" +"cnv_fwd_aaa" +"cnv_fwd_cpms_abst_dx_le" +"cnv_fwd_cpm_SO" +"cnv_fwd_cpms_total" +"cnv_fwd_csx" +"cnv_fwd_flat" +"cnv_fwd_fsb" +"cnv_fwd_pair_sn" +"cnv_ind_cpes" +"cnv_inv_appl" +"cnv_inv_appl_aux" +"cnv_inv_appl_cpes" +"cnv_inv_appl_cpts" +"cnv_inv_appl_ntas" +"cnv_inv_bind" +"cnv_inv_bind_aux" +"cnv_inv_cast" +"cnv_inv_cast_aux" +"cnv_inv_cast_cpes" +"cnv_inv_cast_cpts" +"cnv_inv_gref" +"cnv_inv_gref_aux" +"cnv_inv_lifts" +"cnv_inv_lref" +"cnv_inv_lref_atom" +"cnv_inv_lref_aux" +"cnv_inv_lref_drops" +"cnv_inv_lref_pair" +"cnv_inv_lref_unit" +"cnv_inv_zero" +"cnv_inv_zero_aux" +"cnv_lifts" +"cnv_lprs_trans" +"cnv_lpr_trans" +"cnv_lref" +"cnv_lref_drops" +"cnv_nta_sn" +"cnv_preserve" +"cnv_R_cpmuwe_dec" +"cnv_R_cpmuwe_total" +"cnv_sort" +"cnv_zero" +"cnx" +"cnx_abst" +"cnx_appl_simple" +"cnx_csx" +"cnx_inv_abbr_neg" +"cnx_inv_abbr_pos" +"cnx_inv_abst" +"cnx_inv_appl" +"cnx_inv_cast" +"cnx_inv_lifts" +"cnx_inv_lref_pair" +"cnx_lifts" +"cnx_lref_atom" +"cnx_lref_unit" +"cnx_sort" +"cnx_teqx_trans" +"cpc" +"cpc_conf" +"cpc_cpcs" +"cpc_fwd_cpr" +"cpc_refl" +"cpcs" +"cpcs_aaa_mono" +"cpcs_bind1" +"cpcs_bind2" +"cpcs_bind_dx" +"cpcs_bind_sn" +"cpcs_canc_dx" +"cpcs_canc_sn" +"cpcs_cpr_conf" +"cpcs_cpr_div" +"cpcs_cprs_conf" +"cpcs_cprs_div" +"cpcs_cprs_dx" +"cpcs_cprs_sn" +"cpcs_cprs_step_dx" +"cpcs_cprs_step_sn" +"cpcs_cpr_step_dx" +"cpcs_cpr_step_sn" +"cpcs_flat" +"cpcs_flat_dx_cpr_rev" +"cpcs_ind_dx" +"cpcs_ind_sn" +"cpcs_inv_abst_bi_dx" +"cpcs_inv_abst_bi_sn" +"cpcs_inv_abst_dx" +"cpcs_inv_abst_sn" +"cpcs_inv_cprs" +"cpcs_inv_lifts_bi" +"cpcs_inv_sort_abst" +"cpcs_inv_sort_bi" +"cpcs_lifts_bi" +"cpcs_refl" +"cpcs_step_dx" +"cpcs_step_sn" +"cpcs_strip" +"cpcs_sym" +"cpcs_trans" +"cpc_sym" +"cpes" +"cpes_aaa_mono" +"cpes_cpes_trans" +"cpes_cpms_div" +"cpes_cprs_trans" +"cpes_fwd_abst_bi" +"cpes_refl" +"cpes_refl_aaa" +"cpes_sym" +"cpg" +"cpg_appl" +"cpg_atom" +"cpg_beta" +"cpg_bind" +"cpg_cast" +"cpg_cpx" +"cpg_delta" +"cpg_delta_drops" +"cpg_ee" +"cpg_ell" +"cpg_ell_drops" +"cpg_eps" +"cpg_ess" +"cpg_fwd_bind1_minus" +"cpg_inv_abbr1" +"cpg_inv_abst1" +"cpg_inv_appl1" +"cpg_inv_appl1_aux" +"cpg_inv_appl1_simple" +"cpg_inv_atom1" +"cpg_inv_atom1_aux" +"cpg_inv_atom1_drops" +"cpg_inv_bind1" +"cpg_inv_bind1_aux" +"cpg_inv_cast1" +"cpg_inv_cast1_aux" +"cpg_inv_gref1" +"cpg_inv_lifts_bi" +"cpg_inv_lifts_sn" +"cpg_inv_lref1" +"cpg_inv_lref1_bind" +"cpg_inv_lref1_drops" +"cpg_inv_sort1" +"cpg_inv_zero1" +"cpg_inv_zero1_pair" +"cpg_lifts_bi" +"cpg_lifts_sn" +"cpg_lref" +"cpg_refl" +"cpg_theta" +"cpg_zeta" +"cpm" +"cpm_aaa_conf" +"cpm_appl" +"cpm_beta" +"cpm_bind" +"cpm_bind2" +"cpm_bind_unit" +"cpm_cast" +"cpm_cpms" +"cpm_delta" +"cpm_delta_drops" +"cpm_ee" +"cpm_ell" +"cpm_ell_drops" +"cpm_eps" +"cpm_ess" +"cpm_fpb" +"cpm_fpbq" +"cpm_fsge_comp" +"cpm_fwd_bind1_minus" +"cpm_fwd_cpx" +"cpm_fwd_plus" +"cpm_fwd_plus_aux" +"cpm_ind" +"cpm_inv_abbr1" +"cpm_inv_abst1" +"cpm_inv_abst_bi" +"cpm_inv_appl1" +"cpm_inv_appl1_simple" +"cpm_inv_atom1" +"cpm_inv_atom1_drops" +"cpm_inv_bind1" +"cpm_inv_cast1" +"cpm_inv_gref1" +"cpm_inv_lifts_bi" +"cpm_inv_lifts_sn" +"cpm_inv_lref1" +"cpm_inv_lref1_ctop" +"cpm_inv_lref1_drops" +"cpm_inv_sort1" +"cpm_inv_zero1" +"cpm_inv_zero1_unit" +"cpm_lifts_bi" +"cpm_lifts_sn" +"cpm_lref" +"cpmre" +"cpmre_fwd_cpms" +"cpmre_intro" +"cpmre_total_aaa" +"cpm_rex_conf" +"cpms" +"cpms_aaa_conf" +"cpms_abst_dx_le_aaa" +"cpms_appl" +"cpms_appl_dx" +"cpms_beta" +"cpms_beta_dx" +"cpms_beta_rc" +"cpms_bind" +"cpms_bind2_dx" +"cpms_bind_alt" +"cpms_bind_dx" +"cpms_cast" +"cpms_cast_sn" +"cpms_cprre_trans" +"cpms_cprs_trans" +"cpms_delta" +"cpms_delta_drops" +"cpms_div" +"cpms_ee" +"cpms_ell" +"cpms_ell_drops" +"cpms_eps" +"cpms_fpbg_trans" +"cpms_fwd_cpxs" +"cpms_fwd_fpbs" +"cpms_ind_dx" +"cpms_ind_sn" +"cpms_inv_abbr_abst" +"cpms_inv_abbr_sn_dx" +"cpms_inv_abst_bi" +"cpms_inv_abst_sn" +"cpms_inv_abst_sn_cprs" +"cpms_inv_appl_sn" +"cpms_inv_cast1" +"cpms_inv_delta_sn" +"cpms_inv_ell_sn" +"cpms_inv_gref1" +"cpms_inv_lifts_bi" +"cpms_inv_lifts_sn" +"cpms_inv_lref1_ctop" +"cpms_inv_lref1_drops" +"cpms_inv_lref_sn" +"cpms_inv_plus" +"cpms_inv_sort1" +"cpms_inv_succ_sn" +"cpms_inv_zero1_unit" +"cpms_lifts_bi" +"cpms_lifts_sn" +"cpms_lref" +"cpm_sort" +"cpms_reqx_conf_dx" +"cpms_reqx_conf_sn" +"cpms_sort" +"cpms_step_dx" +"cpms_step_sn" +"cpms_teqx_ind_sn" +"cpms_theta" +"cpms_theta_dx" +"cpms_theta_rc" +"cpms_tneqx_fwd_fpbg" +"cpms_tneqx_fwd_step_sn_aux" +"cpms_total_aaa" +"cpms_trans" +"cpms_trans_swap" +"cpms_zeta" +"cpms_zeta_dx" +"cpm_teqx_free" +"cpm_teqx_ind" +"cpm_teqx_inv_appl_sn" +"cpm_teqx_inv_atom_sn" +"cpm_teqx_inv_bind_dx" +"cpm_teqx_inv_bind_sn" +"cpm_teqx_inv_bind_sn_void" +"cpm_teqx_inv_cast_sn" +"cpm_teqx_inv_lref_sn" +"cpm_theta" +"cpm_tneqx_cpm_cpms_teqx_sym_fwd_fpbg" +"cpm_tneqx_cpm_fpbg" +"cpmuwe" +"cpmuwe_abbr_neg" +"cpmuwe_abst" +"cpmuwe_ctop" +"cpmuwe_fwd_cpms" +"cpmuwe_gref" +"cpmuwe_intro" +"cpmuwe_sort" +"cpmuwe_total_csx" +"cpmuwe_zero_unit" +"cpm_zeta" +"cpr_abbr_pos_tneqx" +"cpr_conf" +"cpr_conf_lpr" +"cpr_conf_lpr_atom_atom" +"cpr_conf_lpr_atom_delta" +"cpr_conf_lpr_beta_beta" +"cpr_conf_lpr_bind_bind" +"cpr_conf_lpr_bind_zeta" +"cpr_conf_lpr_delta_delta" +"cpr_conf_lpr_eps_eps" +"cpr_conf_lpr_flat_beta" +"cpr_conf_lpr_flat_eps" +"cpr_conf_lpr_flat_flat" +"cpr_conf_lpr_flat_theta" +"cpr_conf_lpr_theta_theta" +"cpr_conf_lpr_zeta_zeta" +"cpr_cpcs_dx" +"cpr_cpcs_sn" +"cpr_cprs_conf_cpcs" +"cpr_cprs_div" +"cpr_div" +"cpr_ext" +"cpr_flat" +"cpr_ind" +"cpr_inv_atom1" +"cpr_inv_atom1_drops" +"cpr_inv_cast1" +"cpr_inv_flat1" +"cpr_inv_gref1" +"cpr_inv_lref1" +"cpr_inv_lref1_drops" +"cpr_inv_sort1" +"cpr_inv_zero1" +"cpr_pair_sn" +"cprre_cprs_conf" +"cpr_refl" +"cprre_mono" +"cprre_total_csx" +"cprs_abbr_pos_twneq" +"cprs_conf" +"cprs_conf_cpcs" +"cprs_cpr_conf_cpcs" +"cprs_cpr_div" +"cprs_CTC" +"cprs_div" +"cprs_ext" +"cprs_flat" +"cprs_flat_dx" +"cprs_flat_sn" +"cprs_ind_dx" +"cprs_ind_sn" +"cprs_inv_appl_sn" +"cprs_inv_cast1" +"cprs_inv_cnr_sn" +"cprs_inv_CTC" +"cprs_inv_lref1_drops" +"cprs_inv_sort1" +"cprs_lpr_conf_dx" +"cprs_lpr_conf_sn" +"cprs_nta_trans" +"cprs_nta_trans_cnv" +"cprs_refl" +"cprs_step_dx" +"cprs_step_sn" +"cprs_strip" +"cprs_trans" +"cpr_subst" +"cpt" +"cpt_appl" +"cpt_bind" +"cpt_cast" +"cpt_cpts" +"cpt_delta" +"cpt_delta_drops" +"cpt_ee" +"cpt_ell" +"cpt_ell_drops" +"cpt_ess" +"cpt_fwd_cpm" +"cpt_fwd_plus" +"cpt_fwd_plus_aux" +"cpt_ind" +"cpt_inv_appl_sn" +"cpt_inv_atom_sn" +"cpt_inv_atom_sn_drops" +"cpt_inv_bind_sn" +"cpt_inv_cast_sn" +"cpt_inv_gref_sn" +"cpt_inv_lifts_bi" +"cpt_inv_lifts_sn" +"cpt_inv_lref_sn" +"cpt_inv_lref_sn_ctop" +"cpt_inv_lref_sn_drops" +"cpt_inv_sort_sn" +"cpt_inv_zero_sn" +"cpt_inv_zero_sn_unit" +"cpt_lifts_bi" +"cpt_lifts_sn" +"cpt_lref" +"cpt_refl" +"cpts" +"cpts_appl_dx" +"cpts_bind_dx" +"cpts_cast_sn" +"cpts_cpms_conf_eq" +"cpts_cprs_trans" +"cpts_delta" +"cpts_delta_drops" +"cpts_ee" +"cpts_ell" +"cpts_ell_drops" +"cpts_fwd_cpms" +"cpts_ind_dx" +"cpts_ind_sn" +"cpts_inv_cast_sn" +"cpts_inv_delta_sn" +"cpts_inv_ell_sn" +"cpts_inv_gref_sn" +"cpts_inv_lifts_bi" +"cpts_inv_lifts_sn" +"cpts_inv_lref_sn" +"cpts_inv_lref_sn_ctop" +"cpts_inv_lref_sn_drops" +"cpts_inv_sort_sn" +"cpts_inv_succ_sn" +"cpts_inv_zero_sn_unit" +"cpts_lifts_bi" +"cpts_lifts_sn" +"cpts_lref" +"cpt_sort" +"cpts_refl" +"cpts_sort" +"cpts_step_dx" +"cpts_step_sn" +"cpts_total_aaa" +"cpx" +"cpx_aaa_conf" +"cpx_aaa_conf_lpx" +"cpx_beta" +"cpx_bind" +"cpx_bind2" +"cpx_bind_unit" +"cpx_cpxs" +"cpx_delta" +"cpx_delta_drops" +"cpx_ee" +"cpx_eps" +"cpx_ess" +"cpx_ext" +"cpx_flat" +"cpx_fsge_comp" +"cpx_fwd_bind1_minus" +"cpx_ind" +"cpx_inv_abbr1" +"cpx_inv_abst1" +"cpx_inv_appl1" +"cpx_inv_appl1_simple" +"cpx_inv_atom1" +"cpx_inv_atom1_drops" +"cpx_inv_bind1" +"cpx_inv_cast1" +"cpx_inv_flat1" +"cpx_inv_gref1" +"cpx_inv_lifts_bi" +"cpx_inv_lifts_sn" +"cpx_inv_lref1" +"cpx_inv_lref1_bind" +"cpx_inv_lref1_drops" +"cpx_inv_sort1" +"cpx_inv_zero1" +"cpx_inv_zero1_pair" +"cpx_lifts_bi" +"cpx_lifts_sn" +"cpx_lref" +"cpx_pair_sn" +"cpx_refl" +"cpx_req_conf_sn" +"cpx_reqx_conf" +"cpx_reqx_conf_dx" +"cpx_reqx_conf_sn" +"cpx_rex_conf" +"cpxs" +"cpxs_aaa_conf" +"cpxs_beta" +"cpxs_beta_dx" +"cpxs_beta_rc" +"cpxs_bind" +"cpxs_bind2_dx" +"cpxs_bind_alt" +"cpxs_bind_dx" +"cpxs_cnx" +"cpxs_delta" +"cpxs_delta_drops" +"cpxs_ee" +"cpxs_eps" +"cpxs_ext" +"cpxs_flat" +"cpxs_flat_dx" +"cpxs_flat_sn" +"cpxs_fpbg_trans" +"cpxs_fpbs" +"cpxs_fpbs_trans" +"cpxs_fqup_fpbs" +"cpxs_fqus_fpbs" +"cpxs_fqus_lpxs_fpbs" +"cpxs_fwd_beta" +"cpxs_fwd_beta_vector" +"cpxs_fwd_cast" +"cpxs_fwd_cast_vector" +"cpxs_fwd_cnx" +"cpxs_fwd_cnx_vector" +"cpxs_fwd_delta_drops" +"cpxs_fwd_delta_drops_vector" +"cpxs_fwd_sort" +"cpxs_fwd_sort_vector" +"cpxs_fwd_theta" +"cpxs_fwd_theta_vector" +"cpxs_ind" +"cpxs_ind_dx" +"cpxs_inv_abbr1_dx" +"cpxs_inv_abst1" +"cpxs_inv_appl1" +"cpxs_inv_cast1" +"cpxs_inv_cnx1" +"cpxs_inv_lifts_bi" +"cpxs_inv_lifts_sn" +"cpxs_inv_lref1" +"cpxs_inv_lref1_drops" +"cpxs_inv_sort1" +"cpxs_inv_zero1" +"cpxs_lifts_bi" +"cpxs_lifts_sn" +"cpxs_lref" +"cpxs_pair_sn" +"cpxs_refl" +"cpxs_reqx_conf" +"cpxs_reqx_conf_dx" +"cpxs_reqx_conf_sn" +"cpxs_sort" +"cpxs_strap1" +"cpxs_strap2" +"cpxs_teqx_fpbs" +"cpxs_teqx_fpbs_trans" +"cpxs_theta" +"cpxs_theta_dx" +"cpxs_theta_rc" +"cpxs_tneqx_fpbg" +"cpxs_tneqx_fwd_step_sn" +"cpxs_trans" +"cpx_subst" +"cpxs_zeta" +"cpxs_zeta_dx" +"cpx_teqx_conf" +"cpx_teqx_conf_rex" +"cpx_theta" +"cpx_zeta" +"csx" +"csx_abbr" +"csx_abst" +"csx_appl_beta" +"csx_appl_beta_aux" +"csx_appl_simple" +"csx_appl_simple_teqo" +"csx_appl_theta" +"csx_appl_theta_aux" +"csx_applv_beta" +"csx_applv_cast" +"csx_applv_cnx" +"csx_applv_delta_drops" +"csx_applv_sort" +"csx_applv_theta" +"csx_bind" +"csx_cast" +"csx_cpcs_dec" +"csx_cpxs_trans" +"csx_cpx_trans" +"csx_feqx_conf" +"csx_fpbq_conf" +"csx_fqu_conf" +"csx_fqup_conf" +"csx_fquq_conf" +"csx_fqus_conf" +"csx_fsb" +"csx_fsb_fpbs" +"csx_fwd_applv" +"csx_fwd_bind" +"csx_fwd_bind_dx" +"csx_fwd_bind_dx_aux" +"csx_fwd_bind_dx_unit" +"csx_fwd_bind_dx_unit_aux" +"csx_fwd_bind_unit" +"csx_fwd_flat" +"csx_fwd_flat_dx" +"csx_fwd_flat_dx_aux" +"csx_fwd_pair_sn" +"csx_fwd_pair_sn_aux" +"csx_gcp" +"csx_gcr" +"csx_ind" +"csx_ind_cpxs" +"csx_ind_cpxs_teqx" +"csx_ind_fpb" +"csx_ind_fpbg" +"csx_intro" +"csx_intro_cpxs" +"csx_inv_lifts" +"csx_inv_lref_drops" +"csx_inv_lref_pair_drops" +"csx_lifts" +"csx_lpx_conf" +"csx_lpxs_conf" +"csx_lref_pair_drops" +"csx_lsubr_conf" +"csx_reqx_conf" +"csx_reqx_trans" +"csx_rsx" +"csx_sort" +"csx_teqx_trans" +"csxv" +"csxv_inv_cons" +"drops_lprs_trans" +"drops_lpr_trans" +"drops_lpxs_trans" +"drops_lpx_trans" +"feqx_cpxs_trans" +"feqx_cpx_trans" +"feqx_fpbg_trans" +"feqx_fpbs" +"feqx_fpbs_trans" +"feqx_fpb_trans" +"feqx_lpxs_trans" +"fleq_rpx" +"fpb" +"fpb_cpx" +"fpb_fpbg" +"fpb_fpbg_trans" +"fpb_fpbq" +"fpb_fpbq_fneqx" +"fpb_fpbs" +"fpb_fqu" +"fpbg" +"fpbg_cpms_trans" +"fpbg_feqx_trans" +"fpbg_fpbq_trans" +"fpbg_fpbs_trans" +"fpbg_fqu_trans" +"fpbg_fwd_fpbs" +"fpbg_teqx_div" +"fpbg_trans" +"fpb_inv_feqx" +"fpb_lpx" +"fpbq" +"fpbq_aaa_conf" +"fpbq_cpx" +"fpbq_feqx" +"fpbq_fneqx_inv_fpb" +"fpbq_fpbg_trans" +"fpbq_fpbs" +"fpbq_fquq" +"fpbq_inv_fpb" +"fpbq_lpx" +"fpbq_refl" +"fpbs" +"fpbs_aaa_conf" +"fpbs_cpxs_teqx_fqup_lpx_trans" +"fpbs_cpxs_trans" +"fpbs_cpx_tneqx_trans" +"fpbs_csx_conf" +"fpbs_feqx_trans" +"fpbs_fpbg_trans" +"fpbs_fpb_trans" +"fpbs_fqup_trans" +"fpbs_fqus_trans" +"fpbs_ind" +"fpbs_ind_dx" +"fpbs_intro_star" +"fpbs_inv_fpbg" +"fpbs_inv_star" +"fpbs_lpxs_trans" +"fpbs_lpx_trans" +"fpbs_refl" +"fpbs_strap1" +"fpbs_strap2" +"fpbs_teqx_trans" +"fpbs_trans" +"fqu_cpr_trans_dx" +"fqu_cpr_trans_sn" +"fqu_cpxs_trans" +"fqu_cpxs_trans_tneqx" +"fqu_cpx_trans" +"fqu_cpx_trans_tneqx" +"fqu_lpr_trans" +"fqu_lpx_trans" +"fqup_cpms_fwd_fpbg" +"fqup_cpxs_trans" +"fqup_cpxs_trans_tneqx" +"fqup_cpx_trans" +"fqup_cpx_trans_tneqx" +"fqup_fpbg" +"fqup_fpbg_trans" +"fqup_fpbs" +"fqup_fpbs_trans" +"fquq_cpr_trans_dx" +"fquq_cpr_trans_sn" +"fquq_cpxs_trans" +"fquq_cpxs_trans_tneqx" +"fquq_cpx_trans" +"fquq_cpx_trans_tneqx" +"fquq_lpr_trans" +"fquq_lpx_trans" +"fqus_cpxs_trans" +"fqus_cpxs_trans_tneqx" +"fqus_cpx_trans" +"fqus_cpx_trans_tneqx" +"fqus_fpbs" +"fqus_fpbs_trans" +"fqus_lpxs_fpbs" +"fsb" +"fsb_feqx_trans" +"fsb_fpbg_refl_false" +"fsb_fpbs_trans" +"fsb_ind_alt" +"fsb_ind_fpbg" +"fsb_ind_fpbg_fpbs" +"fsb_intro" +"fsb_intro_fpbg" +"fsb_inv_csx" +"IH_cnv_cpm_conf_lpr" +"IH_cnv_cpms_conf_lpr" +"IH_cnv_cpms_strip_lpr" +"IH_cnv_cpms_trans_lpr" +"IH_cnv_cpm_teqx_conf_lpr" +"IH_cnv_cpm_teqx_cpm_trans" +"IH_cnv_cpm_trans_lpr" +"IH_cpr_conf_lpr" +"jsx" +"jsx_atom" +"jsx_bind" +"jsx_csx_conf" +"jsx_fwd_bind_sn" +"jsx_fwd_drops_atom_sn" +"jsx_fwd_drops_pair_sn" +"jsx_fwd_drops_unit_sn" +"jsx_fwd_lsubr" +"jsx_inv_atom_sn" +"jsx_inv_atom_sn_aux" +"jsx_inv_bind_sn" +"jsx_inv_bind_sn_aux" +"jsx_inv_pair_sn" +"jsx_inv_void_sn" +"jsx_pair" +"jsx_refl" +"jsx_trans" +"lfsx_atom" +"lpr" +"lpr_aaa_conf" +"lpr_bind" +"lpr_bind_refl_dx" +"lpr_conf" +"lpr_cpcs_conf" +"lpr_cpcs_trans" +"lpr_cpms_trans" +"lpr_cpm_trans" +"lpr_cpr_conf" +"lpr_cpr_conf_dx" +"lpr_cpr_conf_sn" +"lpr_cprs_conf" +"lpr_cprs_trans" +"lpr_cpr_trans" +"lpr_drops_conf" +"lpr_drops_trans" +"lpr_fpb" +"lpr_fpbq" +"lpr_fquq_trans" +"lpr_fqu_trans" +"lpr_fwd_length" +"lpr_fwd_lpx" +"lpr_inv_atom_dx" +"lpr_inv_atom_sn" +"lpr_inv_bind_dx" +"lpr_inv_bind_sn" +"lpr_inv_pair" +"lpr_inv_pair_dx" +"lpr_inv_pair_sn" +"lpr_inv_unit_dx" +"lpr_inv_unit_sn" +"lpr_lprs" +"lpr_pair" +"lpr_refl" +"lprs" +"lprs_aaa_conf" +"lprs_bind_refl_dx" +"lprs_conf" +"lprs_cpcs_trans" +"lprs_cpms_trans" +"lprs_cpm_trans" +"lprs_cpr_conf_dx" +"lprs_cpr_conf_sn" +"lprs_cprs_conf" +"lprs_cprs_conf_dx" +"lprs_cprs_conf_sn" +"lprs_CTC" +"lprs_drops_conf" +"lprs_drops_trans" +"lprs_fwd_length" +"lprs_fwd_lpxs" +"lprs_ind" +"lprs_ind_dx" +"lprs_ind_sn" +"lprs_inv_atom_dx" +"lprs_inv_atom_sn" +"lprs_inv_CTC" +"lprs_inv_pair_dx" +"lprs_inv_pair_sn" +"lprs_inv_TC" +"lprs_pair" +"lprs_pair_dx" +"lprs_refl" +"lprs_step_dx" +"lprs_step_sn" +"lprs_strip" +"lprs_TC" +"lprs_trans" +"lpx" +"lpx_aaa_conf" +"lpx_bind" +"lpx_bind_refl_dx" +"lpx_cpx_conf_fsge" +"lpx_cpxs_trans" +"lpx_cpx_trans" +"lpx_drops_conf" +"lpx_drops_trans" +"lpx_fqup_trans" +"lpx_fquq_trans" +"lpx_fqus_trans" +"lpx_fqu_trans" +"lpx_fsge_comp" +"lpx_fwd_length" +"lpx_inv_atom_dx" +"lpx_inv_atom_sn" +"lpx_inv_bind_dx" +"lpx_inv_bind_sn" +"lpx_inv_pair" +"lpx_inv_pair_dx" +"lpx_inv_pair_sn" +"lpx_inv_unit_dx" +"lpx_inv_unit_sn" +"lpx_lpxs" +"lpx_pair" +"lpx_refl" +"lpx_rpx" +"lpxs" +"lpxs_aaa_conf" +"lpxs_bind_refl_dx" +"lpxs_cpxs_trans" +"lpxs_cpx_trans" +"lpxs_drops_conf" +"lpxs_drops_trans" +"lpxs_feqx_fpbs" +"lpxs_fpbs" +"lpxs_fpbs_trans" +"lpxs_fwd_length" +"lpxs_ind" +"lpxs_ind_dx" +"lpxs_ind_sn" +"lpxs_inv_atom_dx" +"lpxs_inv_atom_sn" +"lpxs_inv_bind_sn" +"lpxs_inv_pair_dx" +"lpxs_inv_pair_sn" +"lpxs_pair" +"lpxs_pair_dx" +"lpxs_refl" +"lpxs_rneqx_fpbg" +"lpxs_rneqx_inv_step_sn" +"lpxs_step_dx" +"lpxs_step_sn" +"lpxs_trans" +"lsubr_cpcs_trans" +"lsubr_cpg_trans" +"lsubr_cpms_trans" +"lsubr_cpm_trans" +"lsubr_cpxs_trans" +"lsubr_cpx_trans" +"lsubsv_fwd_lsuba" +"lsubv" +"lsubv_atom" +"lsubv_beta" +"lsubv_bind" +"lsubv_cnv_trans" +"lsubv_cpcs_trans" +"lsubv_cpms_trans" +"lsubv_drops_conf_isuni" +"lsubv_drops_trans_isuni" +"lsubv_fwd_lsubr" +"lsubv_inv_abst_sn" +"lsubv_inv_atom_dx" +"lsubv_inv_atom_dx_aux" +"lsubv_inv_atom_sn" +"lsubv_inv_atom_sn_aux" +"lsubv_inv_bind_dx" +"lsubv_inv_bind_dx_aux" +"lsubv_inv_bind_sn" +"lsubv_inv_bind_sn_aux" +"lsubv_refl" +"lsubv_trans" +"nta" +"nta_abst_predicative" +"nta_abst_repellent" +"nta_appl" +"nta_appl_abst" +"nta_appl_ntas_pos" +"nta_appl_ntas_zero" +"nta_bind_cnv" +"nta_cast" +"nta_cast_old" +"nta_conv" +"nta_conv_cnv" +"nta_cpcs_bi" +"nta_cpcs_conf" +"nta_cpcs_conf_cnv" +"nta_cpr_conf" +"nta_cpr_conf_lpr" +"nta_cprs_conf" +"nta_cprs_trans" +"nta_fwd_aaa" +"nta_fwd_cnv_dx" +"nta_fwd_cnv_sn" +"nta_fwd_correct" +"nta_fwd_fsb" +"nta_ind_cnv" +"nta_ind_ext_cnv" +"nta_ind_ext_cnv_mixed" +"nta_ind_rest_cnv" +"nta_inference_dec" +"nta_inv_abst_bi_cnv" +"nta_inv_appl_sn" +"nta_inv_appl_sn_ntas" +"nta_inv_bind_sn_cnv" +"nta_inv_cast_sn" +"nta_inv_cast_sn_old" +"nta_inv_gref_sn" +"nta_inv_ldec_sn_cnv" +"nta_inv_ldef_sn" +"nta_inv_lifts_sn" +"nta_inv_lref_sn" +"nta_inv_lref_sn_drops_cnv" +"nta_inv_pure_sn_cnv" +"nta_inv_sort_sn" +"nta_ldec_cnv" +"nta_ldec_drops_cnv" +"nta_ldef" +"nta_ldef_drops" +"nta_lifts_bi" +"nta_lifts_sn" +"nta_lpr_conf" +"nta_lprs_conf" +"nta_lref" +"nta_mono" +"nta_ntas" +"nta_pure_cnv" +"ntas" +"ntas_bind_cnv" +"ntas_fwd_cnv_dx" +"ntas_fwd_cnv_sn" +"ntas_ind_bi_nta" +"ntas_intro" +"ntas_inv_appl_sn" +"ntas_inv_nta" +"ntas_inv_plus" +"ntas_inv_zero" +"nta_sort" +"ntas_refl" +"ntas_sort" +"ntas_step_dx" +"ntas_step_sn" +"ntas_trans" +"ntas_zero" +"nta_typecheck" +"nta_typecheck_dec" +"R_cpmuwe" +"R_cpmuwe_total_csx" +"req_cpx_trans" +"reqx_cpxs_trans" +"reqx_cpx_trans" +"reqx_fpb_trans" +"reqx_lpxs_trans" +"reqx_lpx_trans" +"reqx_rpx_trans" +"rpr_fsge_comp" +"rpx" +"rpx_atom" +"rpx_bind" +"rpx_bind_dx_split" +"rpx_bind_dx_split_void" +"rpx_bind_repl_dx" +"rpx_bind_void" +"rpx_cpx_conf" +"rpx_cpx_conf_fsge" +"rpx_cpx_conf_fsge_dx" +"rpx_flat" +"rpx_flat_dx_split" +"rpx_fsge_comp" +"rpx_fwd_bind_dx" +"rpx_fwd_bind_dx_void" +"rpx_fwd_flat_dx" +"rpx_fwd_length" +"rpx_fwd_pair_sn" +"rpx_gref" +"rpx_inv_atom_dx" +"rpx_inv_atom_sn" +"rpx_inv_bind" +"rpx_inv_bind_void" +"rpx_inv_flat" +"rpx_inv_gref" +"rpx_inv_gref_bind_dx" +"rpx_inv_gref_bind_sn" +"rpx_inv_lifts_bi" +"rpx_inv_lifts_dx" +"rpx_inv_lifts_sn" +"rpx_inv_lpx_req" +"rpx_inv_lref" +"rpx_inv_lref_bind_dx" +"rpx_inv_lref_bind_sn" +"rpx_inv_sort" +"rpx_inv_sort_bind_dx" +"rpx_inv_sort_bind_sn" +"rpx_inv_zero_length" +"rpx_inv_zero_pair_dx" +"rpx_inv_zero_pair_sn" +"rpx_lifts_sn" +"rpx_lref" +"rpx_pair" +"rpx_pair_refl" +"rpx_pair_sn_split" +"rpx_refl" +"rpx_reqx_conf" +"rpx_sort" +"rpx_teqx_conf" +"rpx_teqx_div" +"rsx" +"rsx_bind" +"rsx_bind_lpxs_aux" +"rsx_bind_lpxs_void_aux" +"rsx_bind_void" +"rsx_cpxs_trans" +"rsx_cpx_trans" +"rsx_cpx_trans_jsx" +"rsx_flat" +"rsx_flat_lpxs" +"rsx_fwd_bind_dx_void" +"rsx_fwd_flat_dx" +"rsx_fwd_lref_pair_csx" +"rsx_fwd_lref_pair_csx_aux" +"rsx_fwd_lref_pair_csx_drops" +"rsx_fwd_lref_pair_drops" +"rsx_fwd_pair" +"rsx_fwd_pair_aux" +"rsx_fwd_pair_sn" +"rsx_gref" +"rsx_ind" +"rsx_ind_lpxs" +"rsx_ind_lpxs_reqx" +"rsx_intro" +"rsx_intro_lpxs" +"rsx_inv_bind_void" +"rsx_inv_flat" +"rsx_inv_lifts" +"rsx_inv_lref_drops" +"rsx_inv_lref_pair" +"rsx_inv_lref_pair_drops" +"rsx_jsx_trans" +"rsx_lifts" +"rsx_lpxs_trans" +"rsx_lpx_trans" +"rsx_lref_atom_drops" +"rsx_lref_pair" +"rsx_lref_pair_drops" +"rsx_lref_pair_lpxs" +"rsx_lref_unit_drops" +"rsx_reqx_trans" +"rsx_sort" +"rsx_unit" +"teqx_cpxs_trans" +"teqx_cpx_trans" +"teqx_fpbs_trans" +"teqx_fpb_trans" +"teqx_reqx_lpx_fpbs" diff --git a/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpg_drops.ma b/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpg_drops.ma index 686676a94..e1278eadf 100644 --- a/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpg_drops.ma +++ b/matita/matita/contribs/lambdadelta/basic_2/rt_transition/cpg_drops.ma @@ -60,8 +60,7 @@ lemma cpg_inv_lref1_drops: ∀Rt,c,h,G,i,L,T2. ❪G,L❫ ⊢ #i ⬈[Rt,c,h] T2 /3 width=1 by or3_intro0, conj/ ] * #cV #L #W #W2 #HKL #HW2 #HWV2 #H destruct - lapply (lifts_trans … HWV2 … HVT2 ??) -V2 [3,6: |*: // ] #H -(* lapply (lifts_uni … H) -H #H *) (**) + lapply (lifts_trans … HWV2 … HVT2 (𝐔❨↑↑i❩) ?) -V2 [1,3: // ] #H (**) (* explicit rtmap *) /4 width=8 by drops_drop, ex4_4_intro, or3_intro2, or3_intro1/ ] qed-. diff --git a/matita/matita/contribs/lambdadelta/basic_2A/names.txt b/matita/matita/contribs/lambdadelta/basic_2A/names.txt index 25e865b6f..2f23d0fda 100644 --- a/matita/matita/contribs/lambdadelta/basic_2A/names.txt +++ b/matita/matita/contribs/lambdadelta/basic_2A/names.txt @@ -1,1919 +1,1919 @@ -aaa -aaa_abbr -aaa_abst -aaa_appl -aaa_cast -aaa_csx -aaa_da -aaa_fqu_conf -aaa_fqup_conf -aaa_fquq_conf -aaa_fqus_conf -aaa_fsb -aaa_fsba -aaa_ind_csx -aaa_ind_csx_alt -aaa_ind_csx_alt_aux -aaa_ind_csx_aux -aaa_ind_fpb -aaa_ind_fpb_aux -aaa_ind_fpbg -aaa_ind_fpbg_aux -aaa_inv_abbr -aaa_inv_abbr_aux -aaa_inv_abst -aaa_inv_abst_aux -aaa_inv_appl -aaa_inv_appl_aux -aaa_inv_cast -aaa_inv_cast_aux -aaa_inv_gref -aaa_inv_gref_aux -aaa_inv_lift -aaa_inv_lref -aaa_inv_lref_aux -aaa_inv_sort -aaa_inv_sort_aux -aaa_lift -aaa_lifts -aaa_lleq_conf -aaa_lref -aaa_lstas -aaa_mono -aaa_sort -aarity -AAtom -Abbr -Abst -acr -acr_aaa -acr_aaa_csubc_lifts -acr_abst -acr_gcr -APair -append -append_assoc -append_atom_sn -append_inj_dx -append_inj_sn -append_inv_pair_dx -append_inv_refl_dx -append_length -Appl -ApplDelta -ApplDelta_lift -ApplOmega1 -ApplOmega2 -ApplOmega3 -applv -applv_simple -at -at_ge -at_inv_cons -at_inv_cons_aux -at_inv_cons_ge -at_inv_cons_lt -at_inv_nil -at_inv_nil_aux -at_lt -at_mono -at_nil -bind2 -Bind2 -candidate -Cast -ceq -cfun -cir -cir_appl -cir_cnr -cir_gref -cir_ib2 -cir_inv_appl -cir_inv_bind -cir_inv_delta -cir_inv_flat -cir_inv_ib2 -cir_inv_lift -cir_inv_ri2 -cir_lift -cir_sort -cix -cix_appl -cix_cnx -cix_gref -cix_ib2 -cix_inv_appl -cix_inv_bind -cix_inv_cir -cix_inv_delta -cix_inv_flat -cix_inv_ib2 -cix_inv_lift -cix_inv_ri2 -cix_inv_sort -cix_lift -cix_lref -cix_sort -cnr -cnr_abst -cnr_appl_simple -cnr_dec -cnr_inv_abbr -cnr_inv_abst -cnr_inv_appl -cnr_inv_cir -cnr_inv_crr -cnr_inv_delta -cnr_inv_eps -cnr_inv_lift -cnr_inv_zeta -cnr_lift -cnr_lref_abst -cnr_lref_atom -cnr_lref_free -cnr_sort -cnx -cnx_abst -cnx_appl_simple -cnx_csx -cnx_dec -cnx_fwd_cnr -cnx_inv_abbr -cnx_inv_abst -cnx_inv_appl -cnx_inv_cix -cnx_inv_crx -cnx_inv_delta -cnx_inv_eps -cnx_inv_lift -cnx_inv_sort -cnx_inv_zeta -cnx_lift -cnx_lref_atom -cnx_lref_free -cnx_sort -cnx_sort_iter -CP0 -CP1 -CP2 -CP3 -cpc -cpc_conf -cpc_cpcs -cpc_fwd_cpr -cpc_refl -cpcs -cpcs_aaa_mono -cpcs_bind1 -cpcs_bind2 -cpcs_bind_dx -cpcs_bind_sn -cpcs_canc_dx -cpcs_canc_sn -cpcs_cpr_conf -cpcs_cpr_div -cpcs_cprs_conf -cpcs_cprs_div -cpcs_cprs_dx -cpcs_cprs_sn -cpcs_cprs_strap1 -cpcs_cprs_strap2 -cpcs_cpr_strap1 -cpcs_cpr_strap2 -cpcs_flat -cpcs_flat_dx_cpr_rev -cpcs_ind -cpcs_ind_dx -cpcs_inv_abst1 -cpcs_inv_abst2 -cpcs_inv_abst_dx -cpcs_inv_abst_sn -cpcs_inv_cprs -cpcs_inv_lift -cpcs_inv_sort -cpcs_inv_sort_abst -cpcs_lift -cpcs_refl -cpcs_scpes -cpcs_strap1 -cpcs_strap2 -cpcs_strip -cpcs_sym -cpcs_trans -cpc_sym -cpr -cpr_aaa_conf -cpr_ApplOmega_12 -cpr_ApplOmega_23 -cpr_atom -cpr_beta -cpr_bind -cpr_bind2 -cpr_conf -cpr_conf_lpr -cpr_conf_lpr_atom_atom -cpr_conf_lpr_atom_delta -cpr_conf_lpr_beta_beta -cpr_conf_lpr_bind_bind -cpr_conf_lpr_bind_zeta -cpr_conf_lpr_delta_delta -cpr_conf_lpr_eps_eps -cpr_conf_lpr_flat_beta -cpr_conf_lpr_flat_eps -cpr_conf_lpr_flat_flat -cpr_conf_lpr_flat_theta -cpr_conf_lpr_theta_theta -cpr_conf_lpr_zeta_zeta -cpr_cpcs_dx -cpr_cpcs_sn -cpr_cprs -cpr_cprs_conf_cpcs -cpr_cprs_div -cpr_cpx -cpr_delift -cpr_delta -cpr_div -cpre -cpre_mono -cpr_eps -cpr_flat -cpr_fpb -cpr_fpbq -cpr_fwd_bind1_minus -cpr_fwd_cir -cpr_inv_abbr1 -cpr_inv_abst1 -cpr_inv_appl1 -cpr_inv_appl1_simple -cpr_inv_atom1 -cpr_inv_atom1_aux -cpr_inv_bind1 -cpr_inv_bind1_aux -cpr_inv_cast1 -cpr_inv_flat1 -cpr_inv_flat1_aux -cpr_inv_gref1 -cpr_inv_lift1 -cpr_inv_lref1 -cpr_inv_sort1 -cpr_lift -cpr_llpx_sn_conf -cpr_lpr_fpbs -cpr_lpr_sta_fpbs -cpr_Omega_12 -cpr_Omega_21 -cpr_pair_sn -cpr_refl -cprs -cprs_aaa_conf -cprs_beta -cprs_beta_dx -cprs_beta_rc -cprs_bind -cprs_bind2 -cprs_bind2_dx -cprs_bind_dx -cprs_conf -cprs_conf_cpcs -cprs_cpr_conf_cpcs -cprs_cpr_div -cprs_cpxs -cprs_delta -cprs_div -cprs_eps -cprs_flat -cprs_flat_dx -cprs_flat_sn -cprs_fpbs -cprs_ind -cprs_ind_dx -cprs_inv_abbr1 -cprs_inv_abst -cprs_inv_abst1 -cprs_inv_appl1 -cprs_inv_cast1 -cprs_inv_cnr1 -cprs_inv_lift1 -cprs_inv_lref1 -cprs_inv_sort1 -cprs_lift -cprs_lpr_conf_dx -cprs_lpr_conf_sn -cprs_refl -cprs_scpds_div -cprs_strap1 -cprs_strap2 -cprs_strip -cprs_theta -cprs_theta_dx -cprs_theta_rc -cprs_trans -cprs_zeta -cpr_theta -cpr_zeta -cpx -cpx_aaa_conf -cpx_atom -cpx_beta -cpx_bind -cpx_bind2 -cpx_cpxs -cpx_ct -cpx_delift -cpx_delta -cpxe -cpx_eps -cpx_flat -cpx_frees_trans -cpx_fwd_bind1_minus -cpx_fwd_cix -cpx_inv_abbr1 -cpx_inv_abst1 -cpx_inv_appl1 -cpx_inv_appl1_simple -cpx_inv_atom1 -cpx_inv_atom1_aux -cpx_inv_bind1 -cpx_inv_bind1_aux -cpx_inv_cast1 -cpx_inv_flat1 -cpx_inv_flat1_aux -cpx_inv_gref1 -cpx_inv_lift1 -cpx_inv_lref1 -cpx_inv_lref1_ge -cpx_inv_sort1 -cpx_lift -cpx_lleq_conf -cpx_lleq_conf_dx -cpx_lleq_conf_sn -cpx_llpx_sn_conf -cpx_lpx_aaa_conf -cpx_pair_sn -cpx_refl -cpxs -cpxs_aaa_conf -cpxs_ApplOmega_13 -cpxs_beta -cpxs_beta_dx -cpxs_beta_rc -cpxs_bind -cpxs_bind2 -cpxs_bind2_dx -cpxs_bind_dx -cpxs_ct -cpxs_delta -cpxs_eps -cpxs_flat -cpxs_flat_dx -cpxs_flat_sn -cpxs_fpbg -cpxs_fpbs -cpxs_fpbs_trans -cpxs_fqup_fpbs -cpxs_fqus_fpbs -cpxs_fqus_lpxs_fpbs -cpxs_fwd_beta -cpxs_fwd_beta_vector -cpxs_fwd_cast -cpxs_fwd_cast_vector -cpxs_fwd_cnx -cpxs_fwd_cnx_vector -cpxs_fwd_delta -cpxs_fwd_delta_vector -cpxs_fwd_sort -cpxs_fwd_sort_vector -cpxs_fwd_theta -cpxs_fwd_theta_vector -cpxs_ind -cpxs_ind_dx -cpxs_inv_abbr1 -cpxs_inv_abst1 -cpxs_inv_appl1 -cpxs_inv_cast1 -cpxs_inv_cnx1 -cpxs_inv_lift1 -cpxs_inv_lref1 -cpxs_inv_sort1 -cpxs_lift -cpxs_lleq_conf -cpxs_lleq_conf_dx -cpxs_lleq_conf_sn -cpxs_neq_inv_step_sn -cpxs_pair_sn -cpxs_refl -cpxs_sort -cpxs_strap1 -cpxs_strap2 -cpx_st -cpxs_theta -cpxs_theta_dx -cpxs_theta_rc -cpxs_trans -cpxs_zeta -cpx_theta -cpx_zeta -cpy -cpy_atom -cpy_bind -cpy_conf_eq -cpy_conf_neq -cpy_cpys -cpy_flat -cpy_full -cpy_fwd_nlift2_ge -cpy_fwd_tw -cpy_fwd_up -cpy_inv_atom1 -cpy_inv_atom1_aux -cpy_inv_bind1 -cpy_inv_bind1_aux -cpy_inv_flat1 -cpy_inv_flat1_aux -cpy_inv_gref1 -cpy_inv_lift1_be -cpy_inv_lift1_be_up -cpy_inv_lift1_eq -cpy_inv_lift1_ge -cpy_inv_lift1_ge_up -cpy_inv_lift1_le -cpy_inv_lift1_le_up -cpy_inv_lref1 -cpy_inv_refl_O2 -cpy_inv_refl_O2_aux -cpy_inv_sort1 -cpy_lift_be -cpy_lift_ge -cpy_lift_le -cpy_refl -cpys -cpysa -cpysa_atom -cpysa_bind -cpysa_cpy_trans -cpysa_flat -cpysa_inv_cpys -cpys_antisym_eq -cpysa_refl -cpysa_subst -cpys_bind -cpys_conf_eq -cpys_conf_neq -cpys_cpysa -cpys_flat -cpys_fwd_tw -cpys_fwd_up -cpys_ind -cpys_ind_alt -cpys_ind_dx -cpys_inv_atom1 -cpys_inv_bind1 -cpys_inv_flat1 -cpys_inv_gref1 -cpys_inv_lift1_be -cpys_inv_lift1_be_up -cpys_inv_lift1_eq -cpys_inv_lift1_ge -cpys_inv_lift1_ge_up -cpys_inv_lift1_le -cpys_inv_lift1_le_up -cpys_inv_lift1_subst -cpys_inv_lift1_up -cpys_inv_lref1 -cpys_inv_lref1_drop -cpys_inv_lref1_Y2 -cpys_inv_refl_O2 -cpys_inv_SO2 -cpys_inv_sort1 -cpys_lift_be -cpys_lift_ge -cpys_lift_le -cpy_split_down -cpy_split_up -cpys_refl -cpys_split_up -cpys_strap1 -cpys_strap1_down -cpys_strap2 -cpys_strap2_down -cpys_strip_eq -cpys_strip_neq -cpys_subst -cpys_subst_Y2 -cpys_trans_down -cpys_trans_eq -cpy_subst -cpys_weak -cpys_weak_full -cpys_weak_top -cpy_trans_down -cpy_trans_ge -cpy_weak -cpy_weak_full -cpy_weak_top -crr -crr_appl_dx -crr_appl_sn -crr_beta -crr_crx -crr_delta -crr_ib2_dx -crr_ib2_sn -crr_inv_appl -crr_inv_appl_aux -crr_inv_gref -crr_inv_gref_aux -crr_inv_ib2 -crr_inv_ib2_aux -crr_inv_lift -crr_inv_lref -crr_inv_lref_aux -crr_inv_sort -crr_inv_sort_aux -crr_lift -crr_ri2 -crr_theta -crx -crx_appl_dx -crx_appl_sn -crx_beta -crx_delta -crx_ib2_dx -crx_ib2_sn -crx_inv_appl -crx_inv_appl_aux -crx_inv_gref -crx_inv_gref_aux -crx_inv_ib2 -crx_inv_ib2_aux -crx_inv_lift -crx_inv_lref -crx_inv_lref_aux -crx_inv_sort -crx_inv_sort_aux -crx_lift -crx_ri2 -crx_sort -crx_theta -csx -csxa -csx_abbr -csx_abst -csxa_cpxs_trans -csxa_csx -csxa_ind -csxa_intro -csxa_intro_aux -csxa_intro_cpx -csx_appl_beta -csx_appl_beta_aux -csx_appl_simple -csx_appl_simple_tsts -csx_appl_theta -csx_appl_theta_aux -csx_applv_beta -csx_applv_cast -csx_applv_cnx -csx_applv_delta -csx_applv_sort -csx_applv_theta -csx_cast -csx_cpre -csx_cpxe -csx_cpxs_trans -csx_cpx_trans -csx_csxa -csx_fpb_conf -csx_fpbs_conf -csx_fqu_conf -csx_fqup_conf -csx_fquq_conf -csx_fqus_conf -csx_fsb -csx_fsb_fpbs -csx_fwd_applv -csx_fwd_bind -csx_fwd_bind_dx -csx_fwd_bind_dx_aux -csx_fwd_flat -csx_fwd_flat_dx -csx_fwd_flat_dx_aux -csx_fwd_pair_sn -csx_fwd_pair_sn_aux -csx_gcp -csx_gcr -csx_ind -csx_ind_alt -csx_ind_fpb -csx_ind_fpbg -csx_intro -csx_intro_cpxs -csx_inv_lift -csx_inv_lref_bind -csx_lift -csx_lleq_conf -csx_lleq_trans -csx_lpx_conf -csx_lpxs_conf -csx_lref_bind -csx_lsx -csx_sort -csxv -csxv_inv_cons -d1_liftable_liftables -d1_liftables_liftables_all -da -da_bind -da_cpr_lpr -da_cpr_lpr_aux -da_cprs_lpr -da_cprs_lpr_aux -da_flat -da_inv_bind -da_inv_bind_aux -da_inv_flat -da_inv_flat_aux -da_inv_gref -da_inv_gref_aux -da_inv_lift -da_inv_lref -da_inv_lref_aux -da_inv_sort -da_inv_sort_aux -da_ldec -da_ldef -da_lift -da_lstas -da_mono -d_appendable_sn -da_scpds_lpr_aux -da_scpes_aux -da_sort -d_deliftable_sn -d_deliftable_sn_llstar -d_deliftable_sn_LTC -dedropable_sn -dedropable_sn_TC -deg_inv_prec -deg_inv_pred -deg_iter -deg_next_SO -deg_O -deg_SO -deg_SO_gt -deg_SO_inv_pos -deg_SO_inv_pos_aux -deg_SO_pos -deg_SO_refl -deg_SO_zero -Delta -Delta_lift -destruct_apair_apair_aux -destruct_lpair_lpair_aux -destruct_sort_sort_aux -destruct_tatom_tatom_aux -destruct_tpair_tpair_aux -discr_apair_xy_x -discr_apair_xy_y -discr_lpair_x_xy -discr_tpair_xy_x -discr_tpair_xy_y -d_liftable -d_liftable1 -d_liftable_llstar -d_liftable_LTC -d_liftables1 -d_liftables1_all -drop -dropable_dx -dropable_dx_TC -dropable_sn -dropable_sn_TC -drop_atom -drop_conf_be -drop_conf_div -drop_conf_ge -drop_conf_le -drop_conf_lt -drop_drop -drop_drop_lt -drop_FT -drop_fwd_be -drop_fwd_drop2 -drop_fwd_length -drop_fwd_length_eq1 -drop_fwd_length_eq2 -drop_fwd_length_ge -drop_fwd_length_le2 -drop_fwd_length_le4 -drop_fwd_length_le_ge -drop_fwd_length_le_le -drop_fwd_length_lt2 -drop_fwd_length_lt4 -drop_fwd_length_minus2 -drop_fwd_length_minus4 -drop_fwd_lw -drop_fwd_lw_lt -drop_fwd_rfw -drop_gen -drop_inv_atom1 -drop_inv_atom1_aux -drop_inv_drop1 -drop_inv_drop1_lt -drop_inv_FT -drop_inv_FT_aux -drop_inv_gen -drop_inv_length_eq -drop_inv_O1_gt -drop_inv_O1_pair1 -drop_inv_O1_pair1_aux -drop_inv_O1_pair2 -drop_inv_O2 -drop_inv_O2_aux -drop_inv_pair1 -drop_inv_refl -drop_inv_skip1 -drop_inv_skip1_aux -drop_inv_skip2 -drop_inv_skip2_aux -drop_inv_T -drop_lprs_trans -drop_lpr_trans -drop_lpxs_trans -drop_lpx_trans -drop_lsubc_trans -drop_mono -drop_O1_append_sn_le -drop_O1_append_sn_le_aux -drop_O1_eq -drop_O1_ex -drop_O1_ge -drop_O1_inj -drop_O1_inv_append1_ge -drop_O1_inv_append1_le -drop_O1_le -drop_O1_lt -drop_O1_pair -drop_pair -drop_refl -drop_refl_atom_O2 -drops -drops_cons -drops_drop_trans -drops_inv_cons -drops_inv_cons_aux -drops_inv_nil -drops_inv_nil_aux -drops_inv_skip2 -drop_skip -drop_skip_lt -drops_lsubc_trans -drops_nil -drop_split -drops_skip -drops_trans -drop_T -drop_trans_ge -drop_trans_ge_comm -drop_trans_le -drop_trans_lt -eq_aarity_dec -eq_bind2_dec -eq_false_inv_tpair_dx -eq_false_inv_tpair_sn -eq_flat2_dec -eq_genv_dec -eq_item0_dec -eq_item2_dec -eq_lenv_dec -eq_term_dec -flat2 -Flat2 -fleq -fleq_canc_dx -fleq_canc_sn -fleq_fpbg_trans -fleq_fpbq -fleq_fpbs -fleq_fpb_trans -fleq_intro -fleq_inv_gen -fleq_refl -fleq_sym -fleq_trans -fpb -fpb_cpx -fpb_fpbg -fpb_fpbg_trans -fpb_fpbq -fpb_fpbq_alt -fpb_fpbs -fpb_fpbsa_trans -fpb_fqu -fpbg -fpbg_fleq_trans -fpbg_fpbq_trans -fpbg_fpbs_trans -fpbg_fwd_fpbs -fpbg_refl -fpbg_trans -fpb_inv_fleq -fpb_lpx -fpbq -fpbqa -fpbq_aaa_conf -fpbqa_inv_fpbq -fpbq_cpx -fpbq_fpbg_trans -fpbq_fpbqa -fpbq_fpbs -fpbq_fquq -fpbq_ind_alt -fpbq_inv_fpb_alt -fpbq_lleq -fpbq_lpx -fpbq_refl -fpbs -fpbsa -fpbs_aaa_conf -fpbsa_inv_fpbs -fpbs_cpxs_trans -fpbs_cpx_trans_neq -fpbs_fpbg -fpbs_fpbg_trans -fpbs_fpbsa -fpbs_fpb_trans -fpbs_fqup_trans -fpbs_fqus_trans -fpbs_ind -fpbs_ind_dx -fpbs_intro_alt -fpbs_inv_alt -fpbs_lleq_trans -fpbs_lpxs_trans -fpbs_refl -fpbs_strap1 -fpbs_strap2 -fpbs_trans -fqu -fqu_bind_dx -fqu_cpr_trans_dx -fqu_cpr_trans_sn -fqu_cpxs_trans -fqu_cpxs_trans_neq -fqu_cpx_trans -fqu_cpx_trans_neq -fqu_drop -fqu_drop_lt -fqu_flat_dx -fqu_fqup -fqu_fquq -fqu_fwd_fw -fqu_fwd_length_lref1 -fqu_fwd_length_lref1_aux -fqu_inv_eq -fqu_inv_eq_aux -fqu_lpr_trans -fqu_lpx_trans -fqu_lref_O -fqu_lref_S_lt -fqup -fqu_pair_sn -fqup_ApplOmega_13 -fqup_bind_dx -fqup_bind_dx_flat_dx -fqup_cpxs_trans -fqup_cpxs_trans_neq -fqup_cpx_trans -fqup_cpx_trans_neq -fqup_drop -fqup_flat_dx -fqup_flat_dx_bind_dx -fqup_flat_dx_pair_sn -fqup_fpbg -fqup_fpbs -fqup_fqus -fqup_fqus_trans -fqup_fwd_fw -fqup_ind -fqup_ind_dx -fqup_inv_step_sn -fqup_lref -fqup_pair_sn -fqup_strap1 -fqup_strap2 -fqup_trans -fqup_wf_ind -fqup_wf_ind_eq -fquq -fquqa -fquqa_drop -fquqa_inv_fquq -fquqa_refl -fquq_bind_dx -fquq_cpr_trans_dx -fquq_cpr_trans_sn -fquq_cpxs_trans -fquq_cpxs_trans_neq -fquq_cpx_trans -fquq_cpx_trans_neq -fquq_drop -fquq_flat_dx -fquq_fquqa -fquq_fqus -fquq_fwd_fw -fquq_fwd_length_lref1 -fquq_fwd_length_lref1_aux -fquq_inv_gen -fquq_lpr_trans -fquq_lpx_trans -fquq_lref_O -fquq_lstas_trans -fquq_pair_sn -fquq_refl -fquq_sta_trans -fqus -fqus_cpxs_trans -fqus_cpxs_trans_neq -fqus_cpx_trans -fqus_cpx_trans_neq -fqus_drop -fqus_fpbs -fqus_fpbs_trans -fqus_fqup_trans -fqus_fwd_fw -fqus_ind -fqus_ind_dx -fqus_inv_gen -fqus_lpxs_fpbs -fqus_lstas_trans -fqus_refl -fqus_strap1 -fqus_strap1_fqu -fqus_strap2 -fqus_strap2_fqu -fqu_sta_trans -fqus_trans -fqu_wf_ind -frees -frees_append -frees_be -frees_bind_dx -frees_bind_dx_O -frees_bind_sn -frees_dec -frees_eq -frees_flat_dx -frees_flat_sn -frees_inv -frees_inv_append -frees_inv_append_aux -frees_inv_bind -frees_inv_bind_O -frees_inv_flat -frees_inv_gref -frees_inv_lift_be -frees_inv_lift_ge -frees_inv_lref -frees_inv_lref_free -frees_inv_lref_ge -frees_inv_lref_lt -frees_inv_lref_skip -frees_inv_sort -frees_lift_ge -frees_lref_be -frees_lref_eq -frees_lreq_conf -frees_S -frees_trans -frees_weak -fsb -fsba -fsba_fpbs_trans -fsba_ind_alt -fsba_intro -fsba_inv_fsb -fsb_fpbs_trans -fsb_fsba -fsb_ind_alt -fsb_ind_fpbg -fsb_intro -fsb_inv_csx -fw -fw_lpair_sn -fw_shift -fw_tpair_dx -fw_tpair_sn -gcp -gcp0_lifts -gcp2_lifts -gcp2_lifts_all -gcr -gcr_aaa -gcr_lift -gcr_lifts -genv -gget -gget_dec -gget_eq -gget_gt -gget_inv_eq -gget_inv_gt -gget_inv_lt -gget_inv_lt_aux -gget_lt -gget_mono -gget_total -GRef -ib2 -IH_da_cpr_lpr -IH_lstas_cpr_lpr -IH_snv_cpr_lpr -IH_snv_lstas -is_lift_dec -item0 -item2 -LAtom -lcosx -lcosx_drop_trans_lt -lcosx_inv_pair -lcosx_inv_succ -lcosx_inv_succ_aux -lcosx_O -lcosx_pair -lcosx_skip -lcosx_sort -length -length_inv_pos_dx -length_inv_pos_dx_ltail -length_inv_pos_sn -length_inv_pos_sn_ltail -length_inv_zero_dx -length_inv_zero_sn -lenv -lenv_ind_alt -lift -lift_bind -lift_conf_be -lift_conf_O1 -lift_div_be -lift_div_le -lift_flat -lift_fwd_pair1 -lift_fwd_pair2 -lift_fwd_tw -lift_gref -lift_inj -lift_inv_bind1 -lift_inv_bind1_aux -lift_inv_bind2 -lift_inv_bind2_aux -lift_inv_flat1 -lift_inv_flat1_aux -lift_inv_flat2 -lift_inv_flat2_aux -lift_inv_gref1 -lift_inv_gref1_aux -lift_inv_gref2 -lift_inv_gref2_aux -lift_inv_lref1 -lift_inv_lref1_aux -lift_inv_lref1_ge -lift_inv_lref1_lt -lift_inv_lref2 -lift_inv_lref2_aux -lift_inv_lref2_be -lift_inv_lref2_ge -lift_inv_lref2_lt -lift_inv_O2 -lift_inv_O2_aux -lift_inv_pair_xy_x -lift_inv_pair_xy_y -lift_inv_sort1 -lift_inv_sort1_aux -lift_inv_sort2 -lift_inv_sort2_aux -lift_lref_ge -lift_lref_ge_minus -lift_lref_ge_minus_eq -lift_lref_lt -lift_mono -lift_refl -lifts -lifts_applv -lifts_bind -lifts_cons -lifts_flat -lift_simple_dx -lift_simple_sn -lifts_inv_applv1 -lifts_inv_bind1 -lifts_inv_cons -lifts_inv_cons_aux -lifts_inv_flat1 -lifts_inv_gref1 -lifts_inv_lref1 -lifts_inv_nil -lifts_inv_nil_aux -lifts_inv_sort1 -lifts_lift_trans -lifts_lift_trans_le -lifts_nil -lift_sort -lift_split -lifts_simple_dx -lifts_simple_sn -lifts_total -lifts_trans -liftsv -liftsv_cons -liftsv_liftv_trans_le -liftsv_nil -lift_total -lift_trans_be -lift_trans_ge -lift_trans_le -liftv -liftv_cons -liftv_inv_cons1 -liftv_inv_cons1_aux -liftv_inv_nil1 -liftv_inv_nil1_aux -liftv_mono -liftv_nil -liftv_total -lleq -lleq_aaa_trans -lleq_bind -lleq_bind_O -lleq_bind_repl_O -lleq_bind_repl_SO -lleq_canc_dx -lleq_canc_sn -lleq_cpxs_trans -lleq_cpx_trans -lleq_dec -lleq_flat -lleq_fpbs -lleq_fpbs_trans -lleq_fpb_trans -lleq_fqup_trans -lleq_fquq_trans -lleq_fqus_trans -lleq_fqu_trans -lleq_free -lleq_fwd_bind_dx -lleq_fwd_bind_O_dx -lleq_fwd_bind_sn -lleq_fwd_drop_dx -lleq_fwd_drop_sn -lleq_fwd_flat_dx -lleq_fwd_flat_sn -lleq_fwd_length -lleq_fwd_lref -lleq_fwd_lref_dx -lleq_fwd_lref_sn -lleq_ge -lleq_ge_up -lleq_gref -lleq_ind -lleq_ind_alt_r -lleq_intro_alt -lleq_intro_alt_r -lleq_inv_alt -lleq_inv_alt_r -lleq_inv_bind -lleq_inv_bind_O -lleq_inv_flat -lleq_inv_lift_be -lleq_inv_lift_ge -lleq_inv_lift_le -lleq_inv_lref_ge -lleq_inv_lref_ge_bi -lleq_inv_lref_ge_dx -lleq_inv_lref_ge_sn -lleq_inv_S -lleq_lift_ge -lleq_lift_le -lleq_llpx_sn_conf -lleq_llpx_sn_trans -lleq_lpxs_trans -lleq_lpx_trans -lleq_lref -lleq_lreq_repl -lleq_lreq_trans -lleq_nlleq_trans -lleq_refl -lleq_skip -lleq_sort -lleq_sym -lleq_trans -lleq_transitive -lleq_Y -llor -llor_atom -llor_skip -llor_tail_cofrees -llor_tail_frees -llor_total -llpx_sn -llpx_sn_alt -llpx_sn_alt_inv_llpx_sn -llpx_sn_alt_r -llpx_sn_alt_r_bind -llpx_sn_alt_r_flat -llpx_sn_alt_r_free -llpx_sn_alt_r_fwd_length -llpx_sn_alt_r_fwd_lref -llpx_sn_alt_r_gref -llpx_sn_alt_r_ind_alt -llpx_sn_alt_r_intro -llpx_sn_alt_r_intro_alt -llpx_sn_alt_r_inv_alt -llpx_sn_alt_r_inv_bind -llpx_sn_alt_r_inv_flat -llpx_sn_alt_r_inv_lpx_sn -llpx_sn_alt_r_lref -llpx_sn_alt_r_skip -llpx_sn_alt_r_sort -llpx_sn_bind -llpx_sn_bind_O -llpx_sn_bind_repl_O -llpx_sn_bind_repl_SO -llpx_sn_co -llpx_sn_dec -llpx_sn_drop_conf_O -llpx_sn_drop_trans_O -llpx_sn_flat -llpx_sn_free -llpx_sn_frees_trans -llpx_sn_frees_trans_aux -llpx_sn_fwd_bind_dx -llpx_sn_fwd_bind_O_dx -llpx_sn_fwd_bind_sn -llpx_sn_fwd_drop_dx -llpx_sn_fwd_drop_sn -llpx_sn_fwd_flat_dx -llpx_sn_fwd_flat_sn -llpx_sn_fwd_length -llpx_sn_fwd_lref -llpx_sn_fwd_lref_aux -llpx_sn_fwd_lref_dx -llpx_sn_fwd_lref_sn -llpx_sn_fwd_pair_sn -llpx_sn_ge -llpx_sn_ge_up -llpx_sn_gref -llpx_sn_ind_alt_r -llpx_sn_intro_alt_r -llpx_sn_inv_alt_r -llpx_sn_inv_bind -llpx_sn_inv_bind_aux -llpx_sn_inv_bind_O -llpx_sn_inv_flat -llpx_sn_inv_flat_aux -llpx_sn_inv_lift_be -llpx_sn_inv_lift_ge -llpx_sn_inv_lift_le -llpx_sn_inv_lift_O -llpx_sn_inv_lref_ge_bi -llpx_sn_inv_lref_ge_dx -llpx_sn_inv_lref_ge_sn -llpx_sn_inv_S -llpx_sn_inv_S_aux -llpx_sn_lift_ge -llpx_sn_lift_le -llpx_sn_llor_dx -llpx_sn_llor_dx_sym -llpx_sn_llor_fwd_sn -llpx_sn_llpx_sn_alt -llpx_sn_lpx_sn_alt_r -llpx_sn_lref -llpx_sn_lrefl -llpx_sn_lreq_repl -llpx_sn_lreq_trans -llpx_sn_refl -llpx_sn_skip -llpx_sn_sort -llpx_sn_TC_pair_dx -llpx_sn_Y -LPair -lpair_ltail -lpr -lpr_aaa_conf -lpr_conf -lpr_cpcs_conf -lpr_cpcs_trans -lpr_cpr_conf -lpr_cpr_conf_dx -lpr_cpr_conf_sn -lpr_cprs_conf -lpr_cprs_trans -lpr_cpr_trans -lpr_drop_conf -lpr_drop_trans_O1 -lpr_fpb -lpr_fpbq -lpr_fwd_length -lpr_inv_atom1 -lpr_inv_atom2 -lpr_inv_pair1 -lpr_inv_pair2 -lpr_lprs -lpr_lpx -lpr_pair -lpr_refl -lprs -lprs_aaa_conf -lprs_conf -lprs_cpcs_trans -lprs_cpr_conf_dx -lprs_cpr_conf_sn -lprs_cprs_conf -lprs_cprs_conf_dx -lprs_cprs_conf_sn -lprs_cprs_trans -lprs_cpr_trans -lprs_drop_conf -lprs_drop_trans_O1 -lprs_fpbs -lprs_fwd_length -lprs_ind -lprs_ind_alt -lprs_ind_dx -lprs_inv_atom1 -lprs_inv_atom2 -lprs_inv_pair1 -lprs_inv_pair2 -lprs_lpxs -lprs_pair -lprs_pair2 -lprs_pair_refl -lprs_refl -lprs_strap1 -lprs_strap2 -lprs_strip -lprs_trans -lpx -lpx_aaa_conf -lpx_cpx_frees_trans -lpx_cpxs_trans -lpx_cpx_trans -lpx_drop_conf -lpx_drop_trans_O1 -lpx_fqup_trans -lpx_fquq_trans -lpx_fqus_trans -lpx_fqu_trans -lpx_frees_trans -lpx_fwd_length -lpx_inv_atom1 -lpx_inv_atom2 -lpx_inv_pair -lpx_inv_pair1 -lpx_inv_pair2 -lpx_lleq_fqup_trans -lpx_lleq_fquq_trans -lpx_lleq_fqus_trans -lpx_lleq_fqu_trans -lpx_lpxs -lpx_pair -lpx_refl -lpxs -lpxs_aaa_conf -lpxs_cpxs_trans -lpxs_cpx_trans -lpxs_drop_conf -lpxs_drop_trans_O1 -lpxs_fpbg -lpxs_fpbs -lpxs_fpbs_trans -lpxs_fqup_trans -lpxs_fquq_trans -lpxs_fqus_trans -lpxs_fwd_length -lpxs_ind -lpxs_ind_alt -lpxs_ind_dx -lpxs_inv_atom1 -lpxs_inv_atom2 -lpxs_inv_pair1 -lpxs_inv_pair2 -lpxs_lleq_fpbs -lpxs_lleq_fqup_trans -lpxs_lleq_fquq_trans -lpxs_lleq_fqus_trans -lpxs_lleq_fqu_trans -lpx_sn -lpx_sn_alt -lpx_sn_alt_atom -lpx_sn_alt_fwd_length -lpx_sn_alt_inv_atom1 -lpx_sn_alt_inv_atom2 -lpx_sn_alt_inv_lpx_sn -lpx_sn_alt_inv_pair1 -lpx_sn_alt_inv_pair2 -lpx_sn_alt_pair -lpx_sn_atom -lpx_sn_conf -lpx_sn_confluent -lpx_sn_deliftable_dropable -lpx_sn_dropable -lpx_sn_dropable_aux -lpx_sn_drop_conf -lpx_sn_drop_trans -lpx_sn_fwd_length -lpx_sn_intro_alt -lpx_sn_inv_alt -lpx_sn_inv_atom1 -lpx_sn_inv_atom1_aux -lpx_sn_inv_atom2 -lpx_sn_inv_atom2_aux -lpx_sn_inv_pair -lpx_sn_inv_pair1 -lpx_sn_inv_pair1_aux -lpx_sn_inv_pair2 -lpx_sn_inv_pair2_aux -lpx_sn_liftable_dedropable -lpxs_nlleq_inv_step_sn -lpx_sn_llpx_sn -lpx_sn_lpx_sn_alt -lpx_sn_LTC_TC_lpx_sn -lpx_sn_pair -lpx_sn_refl -lpx_sn_trans -lpx_sn_transitive -lpxs_pair -lpxs_pair2 -lpxs_pair_refl -lpxs_refl -lpxs_strap1 -lpxs_strap2 -lpxs_trans -LRef -lreq -lreq_atom -lreq_canc_dx -lreq_canc_sn -lreq_cpxs_trans -lreq_cpx_trans -lreq_drop_conf_be -lreq_drop_trans_be -lreq_frees_trans -lreq_fwd_length -lreq_inv_atom1 -lreq_inv_atom1_aux -lreq_inv_atom2 -lreq_inv_O_Y -lreq_inv_O_Y_aux -lreq_inv_pair -lreq_inv_pair1 -lreq_inv_pair1_aux -lreq_inv_pair2 -lreq_inv_succ -lreq_inv_succ1 -lreq_inv_succ1_aux -lreq_inv_succ2 -lreq_inv_zero1 -lreq_inv_zero1_aux -lreq_inv_zero2 -lreq_join -lreq_lleq_trans -lreq_llpx_sn_trans -lreq_lpxs_trans_lleq -lreq_lpxs_trans_lleq_aux -lreq_lpx_trans_lleq -lreq_lpx_trans_lleq_aux -lreq_O2 -lreq_pair -lreq_pair_lt -lreq_pair_O_Y -lreq_refl -lreq_succ -lreq_succ_lt -lreq_sym -lreq_trans -lreq_zero -lstas -lstas_aaa_conf -lstas_appl -lstas_bind -lstas_cast -lstas_conf -lstas_conf_le -lstas_correct -lstas_cpcs_lpr -lstas_cpr -lstas_cpr_aux -lstas_cpr_lpr -lstas_cpr_lpr_aux -lstas_cprs_lpr -lstas_cprs_lpr_aux -lstas_cpxs -lstas_da_conf -lstas_fpbg -lstas_fpbs -lstas_inv_appl1 -lstas_inv_appl1_aux -lstas_inv_bind1 -lstas_inv_bind1_aux -lstas_inv_cast1 -lstas_inv_cast1_aux -lstas_inv_da -lstas_inv_da_ge -lstas_inv_gref1 -lstas_inv_gref1_aux -lstas_inv_lift1 -lstas_inv_lref1 -lstas_inv_lref1_aux -lstas_inv_lref1_O -lstas_inv_lref1_S -lstas_inv_refl_pos -lstas_inv_sort1 -lstas_inv_sort1_aux -lstas_ldef -lstas_lift -lstas_llpx_sn_conf -lstas_lstas -lstas_mono -lstas_scpds -lstas_scpds_aux -lstas_scpds_trans -lstas_scpes_trans -lstas_sort -lstas_split -lstas_split_aux -lstas_succ -lstas_trans -lstas_zero -lsuba -lsuba_aaa_conf -lsuba_aaa_trans -lsuba_atom -lsuba_beta -lsuba_drop_O1_conf -lsuba_drop_O1_trans -lsuba_fwd_lsubr -lsuba_inv_atom1 -lsuba_inv_atom1_aux -lsuba_inv_atom2 -lsuba_inv_atom2_aux -lsuba_inv_pair1 -lsuba_inv_pair1_aux -lsuba_inv_pair2 -lsuba_inv_pair2_aux -lsuba_lsubc -lsuba_pair -lsuba_refl -lsuba_trans -lsubc -lsubc_atom -lsubc_beta -lsubc_drop_O1_trans -lsubc_fwd_lsubr -lsubc_inv_atom1 -lsubc_inv_atom1_aux -lsubc_inv_atom2 -lsubc_inv_atom2_aux -lsubc_inv_pair1 -lsubc_inv_pair1_aux -lsubc_inv_pair2 -lsubc_inv_pair2_aux -lsubc_pair -lsubc_refl -lsubd -lsubd_atom -lsubd_beta -lsubd_da_conf -lsubd_da_trans -lsubd_drop_O1_conf -lsubd_drop_O1_trans -lsubd_fwd_lsubr -lsubd_inv_atom1 -lsubd_inv_atom1_aux -lsubd_inv_atom2 -lsubd_inv_atom2_aux -lsubd_inv_pair1 -lsubd_inv_pair1_aux -lsubd_inv_pair2 -lsubd_inv_pair2_aux -lsubd_pair -lsubd_refl -lsubd_trans -lsubr -lsubr_atom -lsubr_beta -lsubr_cpcs_trans -lsubr_cprs_trans -lsubr_cpr_trans -lsubr_cpxs_trans -lsubr_cpx_trans -lsubr_fwd_drop2_abbr -lsubr_fwd_drop2_pair -lsubr_fwd_length -lsubr_inv_abbr2 -lsubr_inv_abbr2_aux -lsubr_inv_abst1 -lsubr_inv_abst1_aux -lsubr_inv_atom1 -lsubr_inv_atom1_aux -lsubr_inv_pair1 -lsubr_inv_pair1_aux -lsubr_pair -lsubr_refl -lsubr_trans -lsubsv -lsubsv_atom -lsubsv_beta -lsubsv_cpcs_trans -lsubsv_cprs_trans -lsubsv_drop_O1_conf -lsubsv_drop_O1_trans -lsubsv_fwd_lsuba -lsubsv_fwd_lsubd -lsubsv_fwd_lsubr -lsubsv_inv_atom1 -lsubsv_inv_atom1_aux -lsubsv_inv_atom2 -lsubsv_inv_atom2_aux -lsubsv_inv_pair1 -lsubsv_inv_pair1_aux -lsubsv_inv_pair2 -lsubsv_inv_pair2_aux -lsubsv_lstas_trans -lsubsv_pair -lsubsv_refl -lsubsv_scpds_trans -lsubsv_snv_trans -lsubsv_sta_trans -lsuby -lsuby_atom -lsuby_cpysa_trans -lsuby_cpys_trans -lsuby_cpy_trans -lsuby_drop_trans_be -lsuby_fwd_length -lsuby_inv_atom1 -lsuby_inv_atom1_aux -lsuby_inv_pair1 -lsuby_inv_pair1_aux -lsuby_inv_pair2 -lsuby_inv_pair2_aux -lsuby_inv_succ1 -lsuby_inv_succ1_aux -lsuby_inv_succ2 -lsuby_inv_succ2_aux -lsuby_inv_zero1 -lsuby_inv_zero1_aux -lsuby_inv_zero2 -lsuby_inv_zero2_aux -lsuby_O2 -lsuby_pair -lsuby_pair_lt -lsuby_pair_O_Y -lsuby_refl -lsuby_succ -lsuby_succ_lt -lsuby_sym -lsuby_trans -lsuby_zero -lsx -lsxa -lsxa_ind -lsxa_intro -lsxa_intro_aux -lsxa_intro_lpx -lsxa_inv_lsx -lsxa_lleq_trans -lsxa_lpxs_trans -lsx_atom -lsx_bind -lsx_bind_lpxs_aux -lsx_cpx_trans_lcosx -lsx_cpx_trans_O -lsx_flat -lsx_flat_lpxs -lsx_fwd_bind_dx -lsx_fwd_bind_sn -lsx_fwd_flat_dx -lsx_fwd_flat_sn -lsx_fwd_lref_be -lsx_fwd_pair_sn -lsx_ge -lsx_ge_up -lsx_gref -lsx_ind -lsx_ind_alt -lsx_intro -lsx_intro_alt -lsx_inv_bind -lsx_inv_flat -lsx_inv_lift_be -lsx_inv_lift_ge -lsx_inv_lift_le -lsx_lift_ge -lsx_lift_le -lsx_lleq_trans -lsx_lpxs_trans -lsx_lpx_trans -lsx_lref_be -lsx_lref_be_lpxs -lsx_lref_free -lsx_lref_skip -lsx_lreq_conf -lsx_lsxa -lsx_sort -ltail_length -lw -lw_pair -minuss -minuss_ge -minuss_inv_cons1 -minuss_inv_cons1_aux -minuss_inv_cons1_ge -minuss_inv_cons1_lt -minuss_inv_nil1 -minuss_inv_nil1_aux -minuss_lt -minuss_nil -mk_gcp -mk_gcr -mk_sd -mk_sh -nexts_dec -nexts_inj -nexts_le -nexts_lt -nf -nlift_bind_dx -nlift_bind_sn -nlift_flat_dx -nlift_flat_sn -nlift_inv_bind -nlift_inv_flat -nlift_inv_lref_be_SO -nlift_lref_be_SO -nlleq_inv_bind -nlleq_inv_bind_O -nlleq_inv_flat -nlleq_lleq_div -nllpx_sn_inv_bind -nllpx_sn_inv_bind_O -nllpx_sn_inv_flat -Omega1 -Omega2 -pluss -pluss_inv_cons2 -pluss_inv_nil2 -rfw -rfw_lpair_dx -rfw_lpair_sn -rfw_shift -rfw_tpair_dx -rfw_tpair_sn -ri2 -S1 -S2 -S3 -S4 -S5 -S6 -S7 -scpds -scpds_aaa_conf -scpds_conf_eq -scpds_cpr_lpr_aux -scpds_cprs_trans -scpds_div -scpds_fwd_cprs -scpds_fwd_cpxs -scpds_inv_abbr_abst -scpds_inv_abst1 -scpds_inv_lift1 -scpds_inv_lstas_eq -scpds_lift -scpds_strap1 -scpds_strap2 -scpes -scpes_aaa_mono -scpes_canc_dx -scpes_canc_sn -scpes_cpr_lpr_aux -scpes_inv_abst2 -scpes_inv_lstas_eq -scpes_le_aux -scpes_refl -scpes_sym -scpes_trans -sd -sd_d -sd_d_correct -sd_d_SS -sd_O -sd_SO -sh -sh_N -shnv -shnv_cast -shnv_inv_cast -shnv_inv_cast_aux -shnv_inv_snv -simple -simple_atom -simple_flat -simple_inv_bind -simple_inv_bind_aux -simple_inv_pair -simple_tsts_repl_dx -simple_tsts_repl_sn -snv -snv_appl -snv_bind -snv_cast -snv_cast_scpes -snv_cpr_lpr -snv_cpr_lpr_aux -snv_cprs_lpr -snv_cprs_lpr_aux -snv_extended -snv_fqu_conf -snv_fqup_conf -snv_fquq_conf -snv_fqus_conf -snv_fwd_aaa -snv_fwd_da -snv_fwd_fsb -snv_fwd_lstas -snv_inv_appl -snv_inv_appl_aux -snv_inv_bind -snv_inv_bind_aux -snv_inv_cast -snv_inv_cast_aux -snv_inv_gref -snv_inv_gref_aux -snv_inv_lift -snv_inv_lref -snv_inv_lref_aux -snv_lift -snv_lref -snv_lstas -snv_lstas_aux -snv_preserve -snv_restricted -snv_shnv_cast -snv_sort -Sort -sta_cprs_scpds -sta_cpx -sta_cpx_aux -sta_fpb -sta_fpbg -sta_fpbq -sta_fpbs -sta_ldec -TAtom -TC_lpx_sn_fwd_length -TC_lpx_sn_ind -TC_lpx_sn_inv_atom1 -TC_lpx_sn_inv_atom2 -TC_lpx_sn_inv_lpx_sn_LTC -TC_lpx_sn_inv_pair1 -TC_lpx_sn_inv_pair1_aux -TC_lpx_sn_inv_pair2 -TC_lpx_sn_pair -TC_lpx_sn_pair_refl -term -tir_atom -tix_lref -TPair -tpr_cpr -tprs_cprs -trr_inv_atom -trx_inv_atom -tsts -tsts_atom -tsts_canc_dx -tsts_canc_sn -tsts_dec -tsts_inv_atom1 -tsts_inv_atom1_aux -tsts_inv_atom2 -tsts_inv_atom2_aux -tsts_inv_bind_applv_simple -tsts_inv_pair1 -tsts_inv_pair1_aux -tsts_inv_pair2 -tsts_inv_pair2_aux -tsts_pair -tsts_refl -tsts_sym -tsts_trans -tw -tw_pos -unfold -unfold_bind -unfold_flat -unfold_lref -unfold_sort +"aaa" +"aaa_abbr" +"aaa_abst" +"aaa_appl" +"aaa_cast" +"aaa_csx" +"aaa_da" +"aaa_fqu_conf" +"aaa_fqup_conf" +"aaa_fquq_conf" +"aaa_fqus_conf" +"aaa_fsb" +"aaa_fsba" +"aaa_ind_csx" +"aaa_ind_csx_alt" +"aaa_ind_csx_alt_aux" +"aaa_ind_csx_aux" +"aaa_ind_fpb" +"aaa_ind_fpb_aux" +"aaa_ind_fpbg" +"aaa_ind_fpbg_aux" +"aaa_inv_abbr" +"aaa_inv_abbr_aux" +"aaa_inv_abst" +"aaa_inv_abst_aux" +"aaa_inv_appl" +"aaa_inv_appl_aux" +"aaa_inv_cast" +"aaa_inv_cast_aux" +"aaa_inv_gref" +"aaa_inv_gref_aux" +"aaa_inv_lift" +"aaa_inv_lref" +"aaa_inv_lref_aux" +"aaa_inv_sort" +"aaa_inv_sort_aux" +"aaa_lift" +"aaa_lifts" +"aaa_lleq_conf" +"aaa_lref" +"aaa_lstas" +"aaa_mono" +"aaa_sort" +"aarity" +"AAtom" +"Abbr" +"Abst" +"acr" +"acr_aaa" +"acr_aaa_csubc_lifts" +"acr_abst" +"acr_gcr" +"APair" +"append" +"append_assoc" +"append_atom_sn" +"append_inj_dx" +"append_inj_sn" +"append_inv_pair_dx" +"append_inv_refl_dx" +"append_length" +"Appl" +"ApplDelta" +"ApplDelta_lift" +"ApplOmega1" +"ApplOmega2" +"ApplOmega3" +"applv" +"applv_simple" +"at" +"at_ge" +"at_inv_cons" +"at_inv_cons_aux" +"at_inv_cons_ge" +"at_inv_cons_lt" +"at_inv_nil" +"at_inv_nil_aux" +"at_lt" +"at_mono" +"at_nil" +"bind2" +"Bind2" +"candidate" +"Cast" +"ceq" +"cfun" +"cir" +"cir_appl" +"cir_cnr" +"cir_gref" +"cir_ib2" +"cir_inv_appl" +"cir_inv_bind" +"cir_inv_delta" +"cir_inv_flat" +"cir_inv_ib2" +"cir_inv_lift" +"cir_inv_ri2" +"cir_lift" +"cir_sort" +"cix" +"cix_appl" +"cix_cnx" +"cix_gref" +"cix_ib2" +"cix_inv_appl" +"cix_inv_bind" +"cix_inv_cir" +"cix_inv_delta" +"cix_inv_flat" +"cix_inv_ib2" +"cix_inv_lift" +"cix_inv_ri2" +"cix_inv_sort" +"cix_lift" +"cix_lref" +"cix_sort" +"cnr" +"cnr_abst" +"cnr_appl_simple" +"cnr_dec" +"cnr_inv_abbr" +"cnr_inv_abst" +"cnr_inv_appl" +"cnr_inv_cir" +"cnr_inv_crr" +"cnr_inv_delta" +"cnr_inv_eps" +"cnr_inv_lift" +"cnr_inv_zeta" +"cnr_lift" +"cnr_lref_abst" +"cnr_lref_atom" +"cnr_lref_free" +"cnr_sort" +"cnx" +"cnx_abst" +"cnx_appl_simple" +"cnx_csx" +"cnx_dec" +"cnx_fwd_cnr" +"cnx_inv_abbr" +"cnx_inv_abst" +"cnx_inv_appl" +"cnx_inv_cix" +"cnx_inv_crx" +"cnx_inv_delta" +"cnx_inv_eps" +"cnx_inv_lift" +"cnx_inv_sort" +"cnx_inv_zeta" +"cnx_lift" +"cnx_lref_atom" +"cnx_lref_free" +"cnx_sort" +"cnx_sort_iter" +"CP0" +"CP1" +"CP2" +"CP3" +"cpc" +"cpc_conf" +"cpc_cpcs" +"cpc_fwd_cpr" +"cpc_refl" +"cpcs" +"cpcs_aaa_mono" +"cpcs_bind1" +"cpcs_bind2" +"cpcs_bind_dx" +"cpcs_bind_sn" +"cpcs_canc_dx" +"cpcs_canc_sn" +"cpcs_cpr_conf" +"cpcs_cpr_div" +"cpcs_cprs_conf" +"cpcs_cprs_div" +"cpcs_cprs_dx" +"cpcs_cprs_sn" +"cpcs_cprs_strap1" +"cpcs_cprs_strap2" +"cpcs_cpr_strap1" +"cpcs_cpr_strap2" +"cpcs_flat" +"cpcs_flat_dx_cpr_rev" +"cpcs_ind" +"cpcs_ind_dx" +"cpcs_inv_abst1" +"cpcs_inv_abst2" +"cpcs_inv_abst_dx" +"cpcs_inv_abst_sn" +"cpcs_inv_cprs" +"cpcs_inv_lift" +"cpcs_inv_sort" +"cpcs_inv_sort_abst" +"cpcs_lift" +"cpcs_refl" +"cpcs_scpes" +"cpcs_strap1" +"cpcs_strap2" +"cpcs_strip" +"cpcs_sym" +"cpcs_trans" +"cpc_sym" +"cpr" +"cpr_aaa_conf" +"cpr_ApplOmega_12" +"cpr_ApplOmega_23" +"cpr_atom" +"cpr_beta" +"cpr_bind" +"cpr_bind2" +"cpr_conf" +"cpr_conf_lpr" +"cpr_conf_lpr_atom_atom" +"cpr_conf_lpr_atom_delta" +"cpr_conf_lpr_beta_beta" +"cpr_conf_lpr_bind_bind" +"cpr_conf_lpr_bind_zeta" +"cpr_conf_lpr_delta_delta" +"cpr_conf_lpr_eps_eps" +"cpr_conf_lpr_flat_beta" +"cpr_conf_lpr_flat_eps" +"cpr_conf_lpr_flat_flat" +"cpr_conf_lpr_flat_theta" +"cpr_conf_lpr_theta_theta" +"cpr_conf_lpr_zeta_zeta" +"cpr_cpcs_dx" +"cpr_cpcs_sn" +"cpr_cprs" +"cpr_cprs_conf_cpcs" +"cpr_cprs_div" +"cpr_cpx" +"cpr_delift" +"cpr_delta" +"cpr_div" +"cpre" +"cpre_mono" +"cpr_eps" +"cpr_flat" +"cpr_fpb" +"cpr_fpbq" +"cpr_fwd_bind1_minus" +"cpr_fwd_cir" +"cpr_inv_abbr1" +"cpr_inv_abst1" +"cpr_inv_appl1" +"cpr_inv_appl1_simple" +"cpr_inv_atom1" +"cpr_inv_atom1_aux" +"cpr_inv_bind1" +"cpr_inv_bind1_aux" +"cpr_inv_cast1" +"cpr_inv_flat1" +"cpr_inv_flat1_aux" +"cpr_inv_gref1" +"cpr_inv_lift1" +"cpr_inv_lref1" +"cpr_inv_sort1" +"cpr_lift" +"cpr_llpx_sn_conf" +"cpr_lpr_fpbs" +"cpr_lpr_sta_fpbs" +"cpr_Omega_12" +"cpr_Omega_21" +"cpr_pair_sn" +"cpr_refl" +"cprs" +"cprs_aaa_conf" +"cprs_beta" +"cprs_beta_dx" +"cprs_beta_rc" +"cprs_bind" +"cprs_bind2" +"cprs_bind2_dx" +"cprs_bind_dx" +"cprs_conf" +"cprs_conf_cpcs" +"cprs_cpr_conf_cpcs" +"cprs_cpr_div" +"cprs_cpxs" +"cprs_delta" +"cprs_div" +"cprs_eps" +"cprs_flat" +"cprs_flat_dx" +"cprs_flat_sn" +"cprs_fpbs" +"cprs_ind" +"cprs_ind_dx" +"cprs_inv_abbr1" +"cprs_inv_abst" +"cprs_inv_abst1" +"cprs_inv_appl1" +"cprs_inv_cast1" +"cprs_inv_cnr1" +"cprs_inv_lift1" +"cprs_inv_lref1" +"cprs_inv_sort1" +"cprs_lift" +"cprs_lpr_conf_dx" +"cprs_lpr_conf_sn" +"cprs_refl" +"cprs_scpds_div" +"cprs_strap1" +"cprs_strap2" +"cprs_strip" +"cprs_theta" +"cprs_theta_dx" +"cprs_theta_rc" +"cprs_trans" +"cprs_zeta" +"cpr_theta" +"cpr_zeta" +"cpx" +"cpx_aaa_conf" +"cpx_atom" +"cpx_beta" +"cpx_bind" +"cpx_bind2" +"cpx_cpxs" +"cpx_ct" +"cpx_delift" +"cpx_delta" +"cpxe" +"cpx_eps" +"cpx_flat" +"cpx_frees_trans" +"cpx_fwd_bind1_minus" +"cpx_fwd_cix" +"cpx_inv_abbr1" +"cpx_inv_abst1" +"cpx_inv_appl1" +"cpx_inv_appl1_simple" +"cpx_inv_atom1" +"cpx_inv_atom1_aux" +"cpx_inv_bind1" +"cpx_inv_bind1_aux" +"cpx_inv_cast1" +"cpx_inv_flat1" +"cpx_inv_flat1_aux" +"cpx_inv_gref1" +"cpx_inv_lift1" +"cpx_inv_lref1" +"cpx_inv_lref1_ge" +"cpx_inv_sort1" +"cpx_lift" +"cpx_lleq_conf" +"cpx_lleq_conf_dx" +"cpx_lleq_conf_sn" +"cpx_llpx_sn_conf" +"cpx_lpx_aaa_conf" +"cpx_pair_sn" +"cpx_refl" +"cpxs" +"cpxs_aaa_conf" +"cpxs_ApplOmega_13" +"cpxs_beta" +"cpxs_beta_dx" +"cpxs_beta_rc" +"cpxs_bind" +"cpxs_bind2" +"cpxs_bind2_dx" +"cpxs_bind_dx" +"cpxs_ct" +"cpxs_delta" +"cpxs_eps" +"cpxs_flat" +"cpxs_flat_dx" +"cpxs_flat_sn" +"cpxs_fpbg" +"cpxs_fpbs" +"cpxs_fpbs_trans" +"cpxs_fqup_fpbs" +"cpxs_fqus_fpbs" +"cpxs_fqus_lpxs_fpbs" +"cpxs_fwd_beta" +"cpxs_fwd_beta_vector" +"cpxs_fwd_cast" +"cpxs_fwd_cast_vector" +"cpxs_fwd_cnx" +"cpxs_fwd_cnx_vector" +"cpxs_fwd_delta" +"cpxs_fwd_delta_vector" +"cpxs_fwd_sort" +"cpxs_fwd_sort_vector" +"cpxs_fwd_theta" +"cpxs_fwd_theta_vector" +"cpxs_ind" +"cpxs_ind_dx" +"cpxs_inv_abbr1" +"cpxs_inv_abst1" +"cpxs_inv_appl1" +"cpxs_inv_cast1" +"cpxs_inv_cnx1" +"cpxs_inv_lift1" +"cpxs_inv_lref1" +"cpxs_inv_sort1" +"cpxs_lift" +"cpxs_lleq_conf" +"cpxs_lleq_conf_dx" +"cpxs_lleq_conf_sn" +"cpxs_neq_inv_step_sn" +"cpxs_pair_sn" +"cpxs_refl" +"cpxs_sort" +"cpxs_strap1" +"cpxs_strap2" +"cpx_st" +"cpxs_theta" +"cpxs_theta_dx" +"cpxs_theta_rc" +"cpxs_trans" +"cpxs_zeta" +"cpx_theta" +"cpx_zeta" +"cpy" +"cpy_atom" +"cpy_bind" +"cpy_conf_eq" +"cpy_conf_neq" +"cpy_cpys" +"cpy_flat" +"cpy_full" +"cpy_fwd_nlift2_ge" +"cpy_fwd_tw" +"cpy_fwd_up" +"cpy_inv_atom1" +"cpy_inv_atom1_aux" +"cpy_inv_bind1" +"cpy_inv_bind1_aux" +"cpy_inv_flat1" +"cpy_inv_flat1_aux" +"cpy_inv_gref1" +"cpy_inv_lift1_be" +"cpy_inv_lift1_be_up" +"cpy_inv_lift1_eq" +"cpy_inv_lift1_ge" +"cpy_inv_lift1_ge_up" +"cpy_inv_lift1_le" +"cpy_inv_lift1_le_up" +"cpy_inv_lref1" +"cpy_inv_refl_O2" +"cpy_inv_refl_O2_aux" +"cpy_inv_sort1" +"cpy_lift_be" +"cpy_lift_ge" +"cpy_lift_le" +"cpy_refl" +"cpys" +"cpysa" +"cpysa_atom" +"cpysa_bind" +"cpysa_cpy_trans" +"cpysa_flat" +"cpysa_inv_cpys" +"cpys_antisym_eq" +"cpysa_refl" +"cpysa_subst" +"cpys_bind" +"cpys_conf_eq" +"cpys_conf_neq" +"cpys_cpysa" +"cpys_flat" +"cpys_fwd_tw" +"cpys_fwd_up" +"cpys_ind" +"cpys_ind_alt" +"cpys_ind_dx" +"cpys_inv_atom1" +"cpys_inv_bind1" +"cpys_inv_flat1" +"cpys_inv_gref1" +"cpys_inv_lift1_be" +"cpys_inv_lift1_be_up" +"cpys_inv_lift1_eq" +"cpys_inv_lift1_ge" +"cpys_inv_lift1_ge_up" +"cpys_inv_lift1_le" +"cpys_inv_lift1_le_up" +"cpys_inv_lift1_subst" +"cpys_inv_lift1_up" +"cpys_inv_lref1" +"cpys_inv_lref1_drop" +"cpys_inv_lref1_Y2" +"cpys_inv_refl_O2" +"cpys_inv_SO2" +"cpys_inv_sort1" +"cpys_lift_be" +"cpys_lift_ge" +"cpys_lift_le" +"cpy_split_down" +"cpy_split_up" +"cpys_refl" +"cpys_split_up" +"cpys_strap1" +"cpys_strap1_down" +"cpys_strap2" +"cpys_strap2_down" +"cpys_strip_eq" +"cpys_strip_neq" +"cpys_subst" +"cpys_subst_Y2" +"cpys_trans_down" +"cpys_trans_eq" +"cpy_subst" +"cpys_weak" +"cpys_weak_full" +"cpys_weak_top" +"cpy_trans_down" +"cpy_trans_ge" +"cpy_weak" +"cpy_weak_full" +"cpy_weak_top" +"crr" +"crr_appl_dx" +"crr_appl_sn" +"crr_beta" +"crr_crx" +"crr_delta" +"crr_ib2_dx" +"crr_ib2_sn" +"crr_inv_appl" +"crr_inv_appl_aux" +"crr_inv_gref" +"crr_inv_gref_aux" +"crr_inv_ib2" +"crr_inv_ib2_aux" +"crr_inv_lift" +"crr_inv_lref" +"crr_inv_lref_aux" +"crr_inv_sort" +"crr_inv_sort_aux" +"crr_lift" +"crr_ri2" +"crr_theta" +"crx" +"crx_appl_dx" +"crx_appl_sn" +"crx_beta" +"crx_delta" +"crx_ib2_dx" +"crx_ib2_sn" +"crx_inv_appl" +"crx_inv_appl_aux" +"crx_inv_gref" +"crx_inv_gref_aux" +"crx_inv_ib2" +"crx_inv_ib2_aux" +"crx_inv_lift" +"crx_inv_lref" +"crx_inv_lref_aux" +"crx_inv_sort" +"crx_inv_sort_aux" +"crx_lift" +"crx_ri2" +"crx_sort" +"crx_theta" +"csx" +"csxa" +"csx_abbr" +"csx_abst" +"csxa_cpxs_trans" +"csxa_csx" +"csxa_ind" +"csxa_intro" +"csxa_intro_aux" +"csxa_intro_cpx" +"csx_appl_beta" +"csx_appl_beta_aux" +"csx_appl_simple" +"csx_appl_simple_tsts" +"csx_appl_theta" +"csx_appl_theta_aux" +"csx_applv_beta" +"csx_applv_cast" +"csx_applv_cnx" +"csx_applv_delta" +"csx_applv_sort" +"csx_applv_theta" +"csx_cast" +"csx_cpre" +"csx_cpxe" +"csx_cpxs_trans" +"csx_cpx_trans" +"csx_csxa" +"csx_fpb_conf" +"csx_fpbs_conf" +"csx_fqu_conf" +"csx_fqup_conf" +"csx_fquq_conf" +"csx_fqus_conf" +"csx_fsb" +"csx_fsb_fpbs" +"csx_fwd_applv" +"csx_fwd_bind" +"csx_fwd_bind_dx" +"csx_fwd_bind_dx_aux" +"csx_fwd_flat" +"csx_fwd_flat_dx" +"csx_fwd_flat_dx_aux" +"csx_fwd_pair_sn" +"csx_fwd_pair_sn_aux" +"csx_gcp" +"csx_gcr" +"csx_ind" +"csx_ind_alt" +"csx_ind_fpb" +"csx_ind_fpbg" +"csx_intro" +"csx_intro_cpxs" +"csx_inv_lift" +"csx_inv_lref_bind" +"csx_lift" +"csx_lleq_conf" +"csx_lleq_trans" +"csx_lpx_conf" +"csx_lpxs_conf" +"csx_lref_bind" +"csx_lsx" +"csx_sort" +"csxv" +"csxv_inv_cons" +"d1_liftable_liftables" +"d1_liftables_liftables_all" +"da" +"da_bind" +"da_cpr_lpr" +"da_cpr_lpr_aux" +"da_cprs_lpr" +"da_cprs_lpr_aux" +"da_flat" +"da_inv_bind" +"da_inv_bind_aux" +"da_inv_flat" +"da_inv_flat_aux" +"da_inv_gref" +"da_inv_gref_aux" +"da_inv_lift" +"da_inv_lref" +"da_inv_lref_aux" +"da_inv_sort" +"da_inv_sort_aux" +"da_ldec" +"da_ldef" +"da_lift" +"da_lstas" +"da_mono" +"d_appendable_sn" +"da_scpds_lpr_aux" +"da_scpes_aux" +"da_sort" +"d_deliftable_sn" +"d_deliftable_sn_llstar" +"d_deliftable_sn_LTC" +"dedropable_sn" +"dedropable_sn_TC" +"deg_inv_prec" +"deg_inv_pred" +"deg_iter" +"deg_next_SO" +"deg_O" +"deg_SO" +"deg_SO_gt" +"deg_SO_inv_pos" +"deg_SO_inv_pos_aux" +"deg_SO_pos" +"deg_SO_refl" +"deg_SO_zero" +"Delta" +"Delta_lift" +"destruct_apair_apair_aux" +"destruct_lpair_lpair_aux" +"destruct_sort_sort_aux" +"destruct_tatom_tatom_aux" +"destruct_tpair_tpair_aux" +"discr_apair_xy_x" +"discr_apair_xy_y" +"discr_lpair_x_xy" +"discr_tpair_xy_x" +"discr_tpair_xy_y" +"d_liftable" +"d_liftable1" +"d_liftable_llstar" +"d_liftable_LTC" +"d_liftables1" +"d_liftables1_all" +"drop" +"dropable_dx" +"dropable_dx_TC" +"dropable_sn" +"dropable_sn_TC" +"drop_atom" +"drop_conf_be" +"drop_conf_div" +"drop_conf_ge" +"drop_conf_le" +"drop_conf_lt" +"drop_drop" +"drop_drop_lt" +"drop_FT" +"drop_fwd_be" +"drop_fwd_drop2" +"drop_fwd_length" +"drop_fwd_length_eq1" +"drop_fwd_length_eq2" +"drop_fwd_length_ge" +"drop_fwd_length_le2" +"drop_fwd_length_le4" +"drop_fwd_length_le_ge" +"drop_fwd_length_le_le" +"drop_fwd_length_lt2" +"drop_fwd_length_lt4" +"drop_fwd_length_minus2" +"drop_fwd_length_minus4" +"drop_fwd_lw" +"drop_fwd_lw_lt" +"drop_fwd_rfw" +"drop_gen" +"drop_inv_atom1" +"drop_inv_atom1_aux" +"drop_inv_drop1" +"drop_inv_drop1_lt" +"drop_inv_FT" +"drop_inv_FT_aux" +"drop_inv_gen" +"drop_inv_length_eq" +"drop_inv_O1_gt" +"drop_inv_O1_pair1" +"drop_inv_O1_pair1_aux" +"drop_inv_O1_pair2" +"drop_inv_O2" +"drop_inv_O2_aux" +"drop_inv_pair1" +"drop_inv_refl" +"drop_inv_skip1" +"drop_inv_skip1_aux" +"drop_inv_skip2" +"drop_inv_skip2_aux" +"drop_inv_T" +"drop_lprs_trans" +"drop_lpr_trans" +"drop_lpxs_trans" +"drop_lpx_trans" +"drop_lsubc_trans" +"drop_mono" +"drop_O1_append_sn_le" +"drop_O1_append_sn_le_aux" +"drop_O1_eq" +"drop_O1_ex" +"drop_O1_ge" +"drop_O1_inj" +"drop_O1_inv_append1_ge" +"drop_O1_inv_append1_le" +"drop_O1_le" +"drop_O1_lt" +"drop_O1_pair" +"drop_pair" +"drop_refl" +"drop_refl_atom_O2" +"drops" +"drops_cons" +"drops_drop_trans" +"drops_inv_cons" +"drops_inv_cons_aux" +"drops_inv_nil" +"drops_inv_nil_aux" +"drops_inv_skip2" +"drop_skip" +"drop_skip_lt" +"drops_lsubc_trans" +"drops_nil" +"drop_split" +"drops_skip" +"drops_trans" +"drop_T" +"drop_trans_ge" +"drop_trans_ge_comm" +"drop_trans_le" +"drop_trans_lt" +"eq_aarity_dec" +"eq_bind2_dec" +"eq_false_inv_tpair_dx" +"eq_false_inv_tpair_sn" +"eq_flat2_dec" +"eq_genv_dec" +"eq_item0_dec" +"eq_item2_dec" +"eq_lenv_dec" +"eq_term_dec" +"flat2" +"Flat2" +"fleq" +"fleq_canc_dx" +"fleq_canc_sn" +"fleq_fpbg_trans" +"fleq_fpbq" +"fleq_fpbs" +"fleq_fpb_trans" +"fleq_intro" +"fleq_inv_gen" +"fleq_refl" +"fleq_sym" +"fleq_trans" +"fpb" +"fpb_cpx" +"fpb_fpbg" +"fpb_fpbg_trans" +"fpb_fpbq" +"fpb_fpbq_alt" +"fpb_fpbs" +"fpb_fpbsa_trans" +"fpb_fqu" +"fpbg" +"fpbg_fleq_trans" +"fpbg_fpbq_trans" +"fpbg_fpbs_trans" +"fpbg_fwd_fpbs" +"fpbg_refl" +"fpbg_trans" +"fpb_inv_fleq" +"fpb_lpx" +"fpbq" +"fpbqa" +"fpbq_aaa_conf" +"fpbqa_inv_fpbq" +"fpbq_cpx" +"fpbq_fpbg_trans" +"fpbq_fpbqa" +"fpbq_fpbs" +"fpbq_fquq" +"fpbq_ind_alt" +"fpbq_inv_fpb_alt" +"fpbq_lleq" +"fpbq_lpx" +"fpbq_refl" +"fpbs" +"fpbsa" +"fpbs_aaa_conf" +"fpbsa_inv_fpbs" +"fpbs_cpxs_trans" +"fpbs_cpx_trans_neq" +"fpbs_fpbg" +"fpbs_fpbg_trans" +"fpbs_fpbsa" +"fpbs_fpb_trans" +"fpbs_fqup_trans" +"fpbs_fqus_trans" +"fpbs_ind" +"fpbs_ind_dx" +"fpbs_intro_alt" +"fpbs_inv_alt" +"fpbs_lleq_trans" +"fpbs_lpxs_trans" +"fpbs_refl" +"fpbs_strap1" +"fpbs_strap2" +"fpbs_trans" +"fqu" +"fqu_bind_dx" +"fqu_cpr_trans_dx" +"fqu_cpr_trans_sn" +"fqu_cpxs_trans" +"fqu_cpxs_trans_neq" +"fqu_cpx_trans" +"fqu_cpx_trans_neq" +"fqu_drop" +"fqu_drop_lt" +"fqu_flat_dx" +"fqu_fqup" +"fqu_fquq" +"fqu_fwd_fw" +"fqu_fwd_length_lref1" +"fqu_fwd_length_lref1_aux" +"fqu_inv_eq" +"fqu_inv_eq_aux" +"fqu_lpr_trans" +"fqu_lpx_trans" +"fqu_lref_O" +"fqu_lref_S_lt" +"fqup" +"fqu_pair_sn" +"fqup_ApplOmega_13" +"fqup_bind_dx" +"fqup_bind_dx_flat_dx" +"fqup_cpxs_trans" +"fqup_cpxs_trans_neq" +"fqup_cpx_trans" +"fqup_cpx_trans_neq" +"fqup_drop" +"fqup_flat_dx" +"fqup_flat_dx_bind_dx" +"fqup_flat_dx_pair_sn" +"fqup_fpbg" +"fqup_fpbs" +"fqup_fqus" +"fqup_fqus_trans" +"fqup_fwd_fw" +"fqup_ind" +"fqup_ind_dx" +"fqup_inv_step_sn" +"fqup_lref" +"fqup_pair_sn" +"fqup_strap1" +"fqup_strap2" +"fqup_trans" +"fqup_wf_ind" +"fqup_wf_ind_eq" +"fquq" +"fquqa" +"fquqa_drop" +"fquqa_inv_fquq" +"fquqa_refl" +"fquq_bind_dx" +"fquq_cpr_trans_dx" +"fquq_cpr_trans_sn" +"fquq_cpxs_trans" +"fquq_cpxs_trans_neq" +"fquq_cpx_trans" +"fquq_cpx_trans_neq" +"fquq_drop" +"fquq_flat_dx" +"fquq_fquqa" +"fquq_fqus" +"fquq_fwd_fw" +"fquq_fwd_length_lref1" +"fquq_fwd_length_lref1_aux" +"fquq_inv_gen" +"fquq_lpr_trans" +"fquq_lpx_trans" +"fquq_lref_O" +"fquq_lstas_trans" +"fquq_pair_sn" +"fquq_refl" +"fquq_sta_trans" +"fqus" +"fqus_cpxs_trans" +"fqus_cpxs_trans_neq" +"fqus_cpx_trans" +"fqus_cpx_trans_neq" +"fqus_drop" +"fqus_fpbs" +"fqus_fpbs_trans" +"fqus_fqup_trans" +"fqus_fwd_fw" +"fqus_ind" +"fqus_ind_dx" +"fqus_inv_gen" +"fqus_lpxs_fpbs" +"fqus_lstas_trans" +"fqus_refl" +"fqus_strap1" +"fqus_strap1_fqu" +"fqus_strap2" +"fqus_strap2_fqu" +"fqu_sta_trans" +"fqus_trans" +"fqu_wf_ind" +"frees" +"frees_append" +"frees_be" +"frees_bind_dx" +"frees_bind_dx_O" +"frees_bind_sn" +"frees_dec" +"frees_eq" +"frees_flat_dx" +"frees_flat_sn" +"frees_inv" +"frees_inv_append" +"frees_inv_append_aux" +"frees_inv_bind" +"frees_inv_bind_O" +"frees_inv_flat" +"frees_inv_gref" +"frees_inv_lift_be" +"frees_inv_lift_ge" +"frees_inv_lref" +"frees_inv_lref_free" +"frees_inv_lref_ge" +"frees_inv_lref_lt" +"frees_inv_lref_skip" +"frees_inv_sort" +"frees_lift_ge" +"frees_lref_be" +"frees_lref_eq" +"frees_lreq_conf" +"frees_S" +"frees_trans" +"frees_weak" +"fsb" +"fsba" +"fsba_fpbs_trans" +"fsba_ind_alt" +"fsba_intro" +"fsba_inv_fsb" +"fsb_fpbs_trans" +"fsb_fsba" +"fsb_ind_alt" +"fsb_ind_fpbg" +"fsb_intro" +"fsb_inv_csx" +"fw" +"fw_lpair_sn" +"fw_shift" +"fw_tpair_dx" +"fw_tpair_sn" +"gcp" +"gcp0_lifts" +"gcp2_lifts" +"gcp2_lifts_all" +"gcr" +"gcr_aaa" +"gcr_lift" +"gcr_lifts" +"genv" +"gget" +"gget_dec" +"gget_eq" +"gget_gt" +"gget_inv_eq" +"gget_inv_gt" +"gget_inv_lt" +"gget_inv_lt_aux" +"gget_lt" +"gget_mono" +"gget_total" +"GRef" +"ib2" +"IH_da_cpr_lpr" +"IH_lstas_cpr_lpr" +"IH_snv_cpr_lpr" +"IH_snv_lstas" +"is_lift_dec" +"item0" +"item2" +"LAtom" +"lcosx" +"lcosx_drop_trans_lt" +"lcosx_inv_pair" +"lcosx_inv_succ" +"lcosx_inv_succ_aux" +"lcosx_O" +"lcosx_pair" +"lcosx_skip" +"lcosx_sort" +"length" +"length_inv_pos_dx" +"length_inv_pos_dx_ltail" +"length_inv_pos_sn" +"length_inv_pos_sn_ltail" +"length_inv_zero_dx" +"length_inv_zero_sn" +"lenv" +"lenv_ind_alt" +"lift" +"lift_bind" +"lift_conf_be" +"lift_conf_O1" +"lift_div_be" +"lift_div_le" +"lift_flat" +"lift_fwd_pair1" +"lift_fwd_pair2" +"lift_fwd_tw" +"lift_gref" +"lift_inj" +"lift_inv_bind1" +"lift_inv_bind1_aux" +"lift_inv_bind2" +"lift_inv_bind2_aux" +"lift_inv_flat1" +"lift_inv_flat1_aux" +"lift_inv_flat2" +"lift_inv_flat2_aux" +"lift_inv_gref1" +"lift_inv_gref1_aux" +"lift_inv_gref2" +"lift_inv_gref2_aux" +"lift_inv_lref1" +"lift_inv_lref1_aux" +"lift_inv_lref1_ge" +"lift_inv_lref1_lt" +"lift_inv_lref2" +"lift_inv_lref2_aux" +"lift_inv_lref2_be" +"lift_inv_lref2_ge" +"lift_inv_lref2_lt" +"lift_inv_O2" +"lift_inv_O2_aux" +"lift_inv_pair_xy_x" +"lift_inv_pair_xy_y" +"lift_inv_sort1" +"lift_inv_sort1_aux" +"lift_inv_sort2" +"lift_inv_sort2_aux" +"lift_lref_ge" +"lift_lref_ge_minus" +"lift_lref_ge_minus_eq" +"lift_lref_lt" +"lift_mono" +"lift_refl" +"lifts" +"lifts_applv" +"lifts_bind" +"lifts_cons" +"lifts_flat" +"lift_simple_dx" +"lift_simple_sn" +"lifts_inv_applv1" +"lifts_inv_bind1" +"lifts_inv_cons" +"lifts_inv_cons_aux" +"lifts_inv_flat1" +"lifts_inv_gref1" +"lifts_inv_lref1" +"lifts_inv_nil" +"lifts_inv_nil_aux" +"lifts_inv_sort1" +"lifts_lift_trans" +"lifts_lift_trans_le" +"lifts_nil" +"lift_sort" +"lift_split" +"lifts_simple_dx" +"lifts_simple_sn" +"lifts_total" +"lifts_trans" +"liftsv" +"liftsv_cons" +"liftsv_liftv_trans_le" +"liftsv_nil" +"lift_total" +"lift_trans_be" +"lift_trans_ge" +"lift_trans_le" +"liftv" +"liftv_cons" +"liftv_inv_cons1" +"liftv_inv_cons1_aux" +"liftv_inv_nil1" +"liftv_inv_nil1_aux" +"liftv_mono" +"liftv_nil" +"liftv_total" +"lleq" +"lleq_aaa_trans" +"lleq_bind" +"lleq_bind_O" +"lleq_bind_repl_O" +"lleq_bind_repl_SO" +"lleq_canc_dx" +"lleq_canc_sn" +"lleq_cpxs_trans" +"lleq_cpx_trans" +"lleq_dec" +"lleq_flat" +"lleq_fpbs" +"lleq_fpbs_trans" +"lleq_fpb_trans" +"lleq_fqup_trans" +"lleq_fquq_trans" +"lleq_fqus_trans" +"lleq_fqu_trans" +"lleq_free" +"lleq_fwd_bind_dx" +"lleq_fwd_bind_O_dx" +"lleq_fwd_bind_sn" +"lleq_fwd_drop_dx" +"lleq_fwd_drop_sn" +"lleq_fwd_flat_dx" +"lleq_fwd_flat_sn" +"lleq_fwd_length" +"lleq_fwd_lref" +"lleq_fwd_lref_dx" +"lleq_fwd_lref_sn" +"lleq_ge" +"lleq_ge_up" +"lleq_gref" +"lleq_ind" +"lleq_ind_alt_r" +"lleq_intro_alt" +"lleq_intro_alt_r" +"lleq_inv_alt" +"lleq_inv_alt_r" +"lleq_inv_bind" +"lleq_inv_bind_O" +"lleq_inv_flat" +"lleq_inv_lift_be" +"lleq_inv_lift_ge" +"lleq_inv_lift_le" +"lleq_inv_lref_ge" +"lleq_inv_lref_ge_bi" +"lleq_inv_lref_ge_dx" +"lleq_inv_lref_ge_sn" +"lleq_inv_S" +"lleq_lift_ge" +"lleq_lift_le" +"lleq_llpx_sn_conf" +"lleq_llpx_sn_trans" +"lleq_lpxs_trans" +"lleq_lpx_trans" +"lleq_lref" +"lleq_lreq_repl" +"lleq_lreq_trans" +"lleq_nlleq_trans" +"lleq_refl" +"lleq_skip" +"lleq_sort" +"lleq_sym" +"lleq_trans" +"lleq_transitive" +"lleq_Y" +"llor" +"llor_atom" +"llor_skip" +"llor_tail_cofrees" +"llor_tail_frees" +"llor_total" +"llpx_sn" +"llpx_sn_alt" +"llpx_sn_alt_inv_llpx_sn" +"llpx_sn_alt_r" +"llpx_sn_alt_r_bind" +"llpx_sn_alt_r_flat" +"llpx_sn_alt_r_free" +"llpx_sn_alt_r_fwd_length" +"llpx_sn_alt_r_fwd_lref" +"llpx_sn_alt_r_gref" +"llpx_sn_alt_r_ind_alt" +"llpx_sn_alt_r_intro" +"llpx_sn_alt_r_intro_alt" +"llpx_sn_alt_r_inv_alt" +"llpx_sn_alt_r_inv_bind" +"llpx_sn_alt_r_inv_flat" +"llpx_sn_alt_r_inv_lpx_sn" +"llpx_sn_alt_r_lref" +"llpx_sn_alt_r_skip" +"llpx_sn_alt_r_sort" +"llpx_sn_bind" +"llpx_sn_bind_O" +"llpx_sn_bind_repl_O" +"llpx_sn_bind_repl_SO" +"llpx_sn_co" +"llpx_sn_dec" +"llpx_sn_drop_conf_O" +"llpx_sn_drop_trans_O" +"llpx_sn_flat" +"llpx_sn_free" +"llpx_sn_frees_trans" +"llpx_sn_frees_trans_aux" +"llpx_sn_fwd_bind_dx" +"llpx_sn_fwd_bind_O_dx" +"llpx_sn_fwd_bind_sn" +"llpx_sn_fwd_drop_dx" +"llpx_sn_fwd_drop_sn" +"llpx_sn_fwd_flat_dx" +"llpx_sn_fwd_flat_sn" +"llpx_sn_fwd_length" +"llpx_sn_fwd_lref" +"llpx_sn_fwd_lref_aux" +"llpx_sn_fwd_lref_dx" +"llpx_sn_fwd_lref_sn" +"llpx_sn_fwd_pair_sn" +"llpx_sn_ge" +"llpx_sn_ge_up" +"llpx_sn_gref" +"llpx_sn_ind_alt_r" +"llpx_sn_intro_alt_r" +"llpx_sn_inv_alt_r" +"llpx_sn_inv_bind" +"llpx_sn_inv_bind_aux" +"llpx_sn_inv_bind_O" +"llpx_sn_inv_flat" +"llpx_sn_inv_flat_aux" +"llpx_sn_inv_lift_be" +"llpx_sn_inv_lift_ge" +"llpx_sn_inv_lift_le" +"llpx_sn_inv_lift_O" +"llpx_sn_inv_lref_ge_bi" +"llpx_sn_inv_lref_ge_dx" +"llpx_sn_inv_lref_ge_sn" +"llpx_sn_inv_S" +"llpx_sn_inv_S_aux" +"llpx_sn_lift_ge" +"llpx_sn_lift_le" +"llpx_sn_llor_dx" +"llpx_sn_llor_dx_sym" +"llpx_sn_llor_fwd_sn" +"llpx_sn_llpx_sn_alt" +"llpx_sn_lpx_sn_alt_r" +"llpx_sn_lref" +"llpx_sn_lrefl" +"llpx_sn_lreq_repl" +"llpx_sn_lreq_trans" +"llpx_sn_refl" +"llpx_sn_skip" +"llpx_sn_sort" +"llpx_sn_TC_pair_dx" +"llpx_sn_Y" +"LPair" +"lpair_ltail" +"lpr" +"lpr_aaa_conf" +"lpr_conf" +"lpr_cpcs_conf" +"lpr_cpcs_trans" +"lpr_cpr_conf" +"lpr_cpr_conf_dx" +"lpr_cpr_conf_sn" +"lpr_cprs_conf" +"lpr_cprs_trans" +"lpr_cpr_trans" +"lpr_drop_conf" +"lpr_drop_trans_O1" +"lpr_fpb" +"lpr_fpbq" +"lpr_fwd_length" +"lpr_inv_atom1" +"lpr_inv_atom2" +"lpr_inv_pair1" +"lpr_inv_pair2" +"lpr_lprs" +"lpr_lpx" +"lpr_pair" +"lpr_refl" +"lprs" +"lprs_aaa_conf" +"lprs_conf" +"lprs_cpcs_trans" +"lprs_cpr_conf_dx" +"lprs_cpr_conf_sn" +"lprs_cprs_conf" +"lprs_cprs_conf_dx" +"lprs_cprs_conf_sn" +"lprs_cprs_trans" +"lprs_cpr_trans" +"lprs_drop_conf" +"lprs_drop_trans_O1" +"lprs_fpbs" +"lprs_fwd_length" +"lprs_ind" +"lprs_ind_alt" +"lprs_ind_dx" +"lprs_inv_atom1" +"lprs_inv_atom2" +"lprs_inv_pair1" +"lprs_inv_pair2" +"lprs_lpxs" +"lprs_pair" +"lprs_pair2" +"lprs_pair_refl" +"lprs_refl" +"lprs_strap1" +"lprs_strap2" +"lprs_strip" +"lprs_trans" +"lpx" +"lpx_aaa_conf" +"lpx_cpx_frees_trans" +"lpx_cpxs_trans" +"lpx_cpx_trans" +"lpx_drop_conf" +"lpx_drop_trans_O1" +"lpx_fqup_trans" +"lpx_fquq_trans" +"lpx_fqus_trans" +"lpx_fqu_trans" +"lpx_frees_trans" +"lpx_fwd_length" +"lpx_inv_atom1" +"lpx_inv_atom2" +"lpx_inv_pair" +"lpx_inv_pair1" +"lpx_inv_pair2" +"lpx_lleq_fqup_trans" +"lpx_lleq_fquq_trans" +"lpx_lleq_fqus_trans" +"lpx_lleq_fqu_trans" +"lpx_lpxs" +"lpx_pair" +"lpx_refl" +"lpxs" +"lpxs_aaa_conf" +"lpxs_cpxs_trans" +"lpxs_cpx_trans" +"lpxs_drop_conf" +"lpxs_drop_trans_O1" +"lpxs_fpbg" +"lpxs_fpbs" +"lpxs_fpbs_trans" +"lpxs_fqup_trans" +"lpxs_fquq_trans" +"lpxs_fqus_trans" +"lpxs_fwd_length" +"lpxs_ind" +"lpxs_ind_alt" +"lpxs_ind_dx" +"lpxs_inv_atom1" +"lpxs_inv_atom2" +"lpxs_inv_pair1" +"lpxs_inv_pair2" +"lpxs_lleq_fpbs" +"lpxs_lleq_fqup_trans" +"lpxs_lleq_fquq_trans" +"lpxs_lleq_fqus_trans" +"lpxs_lleq_fqu_trans" +"lpx_sn" +"lpx_sn_alt" +"lpx_sn_alt_atom" +"lpx_sn_alt_fwd_length" +"lpx_sn_alt_inv_atom1" +"lpx_sn_alt_inv_atom2" +"lpx_sn_alt_inv_lpx_sn" +"lpx_sn_alt_inv_pair1" +"lpx_sn_alt_inv_pair2" +"lpx_sn_alt_pair" +"lpx_sn_atom" +"lpx_sn_conf" +"lpx_sn_confluent" +"lpx_sn_deliftable_dropable" +"lpx_sn_dropable" +"lpx_sn_dropable_aux" +"lpx_sn_drop_conf" +"lpx_sn_drop_trans" +"lpx_sn_fwd_length" +"lpx_sn_intro_alt" +"lpx_sn_inv_alt" +"lpx_sn_inv_atom1" +"lpx_sn_inv_atom1_aux" +"lpx_sn_inv_atom2" +"lpx_sn_inv_atom2_aux" +"lpx_sn_inv_pair" +"lpx_sn_inv_pair1" +"lpx_sn_inv_pair1_aux" +"lpx_sn_inv_pair2" +"lpx_sn_inv_pair2_aux" +"lpx_sn_liftable_dedropable" +"lpxs_nlleq_inv_step_sn" +"lpx_sn_llpx_sn" +"lpx_sn_lpx_sn_alt" +"lpx_sn_LTC_TC_lpx_sn" +"lpx_sn_pair" +"lpx_sn_refl" +"lpx_sn_trans" +"lpx_sn_transitive" +"lpxs_pair" +"lpxs_pair2" +"lpxs_pair_refl" +"lpxs_refl" +"lpxs_strap1" +"lpxs_strap2" +"lpxs_trans" +"LRef" +"lreq" +"lreq_atom" +"lreq_canc_dx" +"lreq_canc_sn" +"lreq_cpxs_trans" +"lreq_cpx_trans" +"lreq_drop_conf_be" +"lreq_drop_trans_be" +"lreq_frees_trans" +"lreq_fwd_length" +"lreq_inv_atom1" +"lreq_inv_atom1_aux" +"lreq_inv_atom2" +"lreq_inv_O_Y" +"lreq_inv_O_Y_aux" +"lreq_inv_pair" +"lreq_inv_pair1" +"lreq_inv_pair1_aux" +"lreq_inv_pair2" +"lreq_inv_succ" +"lreq_inv_succ1" +"lreq_inv_succ1_aux" +"lreq_inv_succ2" +"lreq_inv_zero1" +"lreq_inv_zero1_aux" +"lreq_inv_zero2" +"lreq_join" +"lreq_lleq_trans" +"lreq_llpx_sn_trans" +"lreq_lpxs_trans_lleq" +"lreq_lpxs_trans_lleq_aux" +"lreq_lpx_trans_lleq" +"lreq_lpx_trans_lleq_aux" +"lreq_O2" +"lreq_pair" +"lreq_pair_lt" +"lreq_pair_O_Y" +"lreq_refl" +"lreq_succ" +"lreq_succ_lt" +"lreq_sym" +"lreq_trans" +"lreq_zero" +"lstas" +"lstas_aaa_conf" +"lstas_appl" +"lstas_bind" +"lstas_cast" +"lstas_conf" +"lstas_conf_le" +"lstas_correct" +"lstas_cpcs_lpr" +"lstas_cpr" +"lstas_cpr_aux" +"lstas_cpr_lpr" +"lstas_cpr_lpr_aux" +"lstas_cprs_lpr" +"lstas_cprs_lpr_aux" +"lstas_cpxs" +"lstas_da_conf" +"lstas_fpbg" +"lstas_fpbs" +"lstas_inv_appl1" +"lstas_inv_appl1_aux" +"lstas_inv_bind1" +"lstas_inv_bind1_aux" +"lstas_inv_cast1" +"lstas_inv_cast1_aux" +"lstas_inv_da" +"lstas_inv_da_ge" +"lstas_inv_gref1" +"lstas_inv_gref1_aux" +"lstas_inv_lift1" +"lstas_inv_lref1" +"lstas_inv_lref1_aux" +"lstas_inv_lref1_O" +"lstas_inv_lref1_S" +"lstas_inv_refl_pos" +"lstas_inv_sort1" +"lstas_inv_sort1_aux" +"lstas_ldef" +"lstas_lift" +"lstas_llpx_sn_conf" +"lstas_lstas" +"lstas_mono" +"lstas_scpds" +"lstas_scpds_aux" +"lstas_scpds_trans" +"lstas_scpes_trans" +"lstas_sort" +"lstas_split" +"lstas_split_aux" +"lstas_succ" +"lstas_trans" +"lstas_zero" +"lsuba" +"lsuba_aaa_conf" +"lsuba_aaa_trans" +"lsuba_atom" +"lsuba_beta" +"lsuba_drop_O1_conf" +"lsuba_drop_O1_trans" +"lsuba_fwd_lsubr" +"lsuba_inv_atom1" +"lsuba_inv_atom1_aux" +"lsuba_inv_atom2" +"lsuba_inv_atom2_aux" +"lsuba_inv_pair1" +"lsuba_inv_pair1_aux" +"lsuba_inv_pair2" +"lsuba_inv_pair2_aux" +"lsuba_lsubc" +"lsuba_pair" +"lsuba_refl" +"lsuba_trans" +"lsubc" +"lsubc_atom" +"lsubc_beta" +"lsubc_drop_O1_trans" +"lsubc_fwd_lsubr" +"lsubc_inv_atom1" +"lsubc_inv_atom1_aux" +"lsubc_inv_atom2" +"lsubc_inv_atom2_aux" +"lsubc_inv_pair1" +"lsubc_inv_pair1_aux" +"lsubc_inv_pair2" +"lsubc_inv_pair2_aux" +"lsubc_pair" +"lsubc_refl" +"lsubd" +"lsubd_atom" +"lsubd_beta" +"lsubd_da_conf" +"lsubd_da_trans" +"lsubd_drop_O1_conf" +"lsubd_drop_O1_trans" +"lsubd_fwd_lsubr" +"lsubd_inv_atom1" +"lsubd_inv_atom1_aux" +"lsubd_inv_atom2" +"lsubd_inv_atom2_aux" +"lsubd_inv_pair1" +"lsubd_inv_pair1_aux" +"lsubd_inv_pair2" +"lsubd_inv_pair2_aux" +"lsubd_pair" +"lsubd_refl" +"lsubd_trans" +"lsubr" +"lsubr_atom" +"lsubr_beta" +"lsubr_cpcs_trans" +"lsubr_cprs_trans" +"lsubr_cpr_trans" +"lsubr_cpxs_trans" +"lsubr_cpx_trans" +"lsubr_fwd_drop2_abbr" +"lsubr_fwd_drop2_pair" +"lsubr_fwd_length" +"lsubr_inv_abbr2" +"lsubr_inv_abbr2_aux" +"lsubr_inv_abst1" +"lsubr_inv_abst1_aux" +"lsubr_inv_atom1" +"lsubr_inv_atom1_aux" +"lsubr_inv_pair1" +"lsubr_inv_pair1_aux" +"lsubr_pair" +"lsubr_refl" +"lsubr_trans" +"lsubsv" +"lsubsv_atom" +"lsubsv_beta" +"lsubsv_cpcs_trans" +"lsubsv_cprs_trans" +"lsubsv_drop_O1_conf" +"lsubsv_drop_O1_trans" +"lsubsv_fwd_lsuba" +"lsubsv_fwd_lsubd" +"lsubsv_fwd_lsubr" +"lsubsv_inv_atom1" +"lsubsv_inv_atom1_aux" +"lsubsv_inv_atom2" +"lsubsv_inv_atom2_aux" +"lsubsv_inv_pair1" +"lsubsv_inv_pair1_aux" +"lsubsv_inv_pair2" +"lsubsv_inv_pair2_aux" +"lsubsv_lstas_trans" +"lsubsv_pair" +"lsubsv_refl" +"lsubsv_scpds_trans" +"lsubsv_snv_trans" +"lsubsv_sta_trans" +"lsuby" +"lsuby_atom" +"lsuby_cpysa_trans" +"lsuby_cpys_trans" +"lsuby_cpy_trans" +"lsuby_drop_trans_be" +"lsuby_fwd_length" +"lsuby_inv_atom1" +"lsuby_inv_atom1_aux" +"lsuby_inv_pair1" +"lsuby_inv_pair1_aux" +"lsuby_inv_pair2" +"lsuby_inv_pair2_aux" +"lsuby_inv_succ1" +"lsuby_inv_succ1_aux" +"lsuby_inv_succ2" +"lsuby_inv_succ2_aux" +"lsuby_inv_zero1" +"lsuby_inv_zero1_aux" +"lsuby_inv_zero2" +"lsuby_inv_zero2_aux" +"lsuby_O2" +"lsuby_pair" +"lsuby_pair_lt" +"lsuby_pair_O_Y" +"lsuby_refl" +"lsuby_succ" +"lsuby_succ_lt" +"lsuby_sym" +"lsuby_trans" +"lsuby_zero" +"lsx" +"lsxa" +"lsxa_ind" +"lsxa_intro" +"lsxa_intro_aux" +"lsxa_intro_lpx" +"lsxa_inv_lsx" +"lsxa_lleq_trans" +"lsxa_lpxs_trans" +"lsx_atom" +"lsx_bind" +"lsx_bind_lpxs_aux" +"lsx_cpx_trans_lcosx" +"lsx_cpx_trans_O" +"lsx_flat" +"lsx_flat_lpxs" +"lsx_fwd_bind_dx" +"lsx_fwd_bind_sn" +"lsx_fwd_flat_dx" +"lsx_fwd_flat_sn" +"lsx_fwd_lref_be" +"lsx_fwd_pair_sn" +"lsx_ge" +"lsx_ge_up" +"lsx_gref" +"lsx_ind" +"lsx_ind_alt" +"lsx_intro" +"lsx_intro_alt" +"lsx_inv_bind" +"lsx_inv_flat" +"lsx_inv_lift_be" +"lsx_inv_lift_ge" +"lsx_inv_lift_le" +"lsx_lift_ge" +"lsx_lift_le" +"lsx_lleq_trans" +"lsx_lpxs_trans" +"lsx_lpx_trans" +"lsx_lref_be" +"lsx_lref_be_lpxs" +"lsx_lref_free" +"lsx_lref_skip" +"lsx_lreq_conf" +"lsx_lsxa" +"lsx_sort" +"ltail_length" +"lw" +"lw_pair" +"minuss" +"minuss_ge" +"minuss_inv_cons1" +"minuss_inv_cons1_aux" +"minuss_inv_cons1_ge" +"minuss_inv_cons1_lt" +"minuss_inv_nil1" +"minuss_inv_nil1_aux" +"minuss_lt" +"minuss_nil" +"mk_gcp" +"mk_gcr" +"mk_sd" +"mk_sh" +"nexts_dec" +"nexts_inj" +"nexts_le" +"nexts_lt" +"nf" +"nlift_bind_dx" +"nlift_bind_sn" +"nlift_flat_dx" +"nlift_flat_sn" +"nlift_inv_bind" +"nlift_inv_flat" +"nlift_inv_lref_be_SO" +"nlift_lref_be_SO" +"nlleq_inv_bind" +"nlleq_inv_bind_O" +"nlleq_inv_flat" +"nlleq_lleq_div" +"nllpx_sn_inv_bind" +"nllpx_sn_inv_bind_O" +"nllpx_sn_inv_flat" +"Omega1" +"Omega2" +"pluss" +"pluss_inv_cons2" +"pluss_inv_nil2" +"rfw" +"rfw_lpair_dx" +"rfw_lpair_sn" +"rfw_shift" +"rfw_tpair_dx" +"rfw_tpair_sn" +"ri2" +"S1" +"S2" +"S3" +"S4" +"S5" +"S6" +"S7" +"scpds" +"scpds_aaa_conf" +"scpds_conf_eq" +"scpds_cpr_lpr_aux" +"scpds_cprs_trans" +"scpds_div" +"scpds_fwd_cprs" +"scpds_fwd_cpxs" +"scpds_inv_abbr_abst" +"scpds_inv_abst1" +"scpds_inv_lift1" +"scpds_inv_lstas_eq" +"scpds_lift" +"scpds_strap1" +"scpds_strap2" +"scpes" +"scpes_aaa_mono" +"scpes_canc_dx" +"scpes_canc_sn" +"scpes_cpr_lpr_aux" +"scpes_inv_abst2" +"scpes_inv_lstas_eq" +"scpes_le_aux" +"scpes_refl" +"scpes_sym" +"scpes_trans" +"sd" +"sd_d" +"sd_d_correct" +"sd_d_SS" +"sd_O" +"sd_SO" +"sh" +"sh_N" +"shnv" +"shnv_cast" +"shnv_inv_cast" +"shnv_inv_cast_aux" +"shnv_inv_snv" +"simple" +"simple_atom" +"simple_flat" +"simple_inv_bind" +"simple_inv_bind_aux" +"simple_inv_pair" +"simple_tsts_repl_dx" +"simple_tsts_repl_sn" +"snv" +"snv_appl" +"snv_bind" +"snv_cast" +"snv_cast_scpes" +"snv_cpr_lpr" +"snv_cpr_lpr_aux" +"snv_cprs_lpr" +"snv_cprs_lpr_aux" +"snv_extended" +"snv_fqu_conf" +"snv_fqup_conf" +"snv_fquq_conf" +"snv_fqus_conf" +"snv_fwd_aaa" +"snv_fwd_da" +"snv_fwd_fsb" +"snv_fwd_lstas" +"snv_inv_appl" +"snv_inv_appl_aux" +"snv_inv_bind" +"snv_inv_bind_aux" +"snv_inv_cast" +"snv_inv_cast_aux" +"snv_inv_gref" +"snv_inv_gref_aux" +"snv_inv_lift" +"snv_inv_lref" +"snv_inv_lref_aux" +"snv_lift" +"snv_lref" +"snv_lstas" +"snv_lstas_aux" +"snv_preserve" +"snv_restricted" +"snv_shnv_cast" +"snv_sort" +"Sort" +"sta_cprs_scpds" +"sta_cpx" +"sta_cpx_aux" +"sta_fpb" +"sta_fpbg" +"sta_fpbq" +"sta_fpbs" +"sta_ldec" +"TAtom" +"TC_lpx_sn_fwd_length" +"TC_lpx_sn_ind" +"TC_lpx_sn_inv_atom1" +"TC_lpx_sn_inv_atom2" +"TC_lpx_sn_inv_lpx_sn_LTC" +"TC_lpx_sn_inv_pair1" +"TC_lpx_sn_inv_pair1_aux" +"TC_lpx_sn_inv_pair2" +"TC_lpx_sn_pair" +"TC_lpx_sn_pair_refl" +"term" +"tir_atom" +"tix_lref" +"TPair" +"tpr_cpr" +"tprs_cprs" +"trr_inv_atom" +"trx_inv_atom" +"tsts" +"tsts_atom" +"tsts_canc_dx" +"tsts_canc_sn" +"tsts_dec" +"tsts_inv_atom1" +"tsts_inv_atom1_aux" +"tsts_inv_atom2" +"tsts_inv_atom2_aux" +"tsts_inv_bind_applv_simple" +"tsts_inv_pair1" +"tsts_inv_pair1_aux" +"tsts_inv_pair2" +"tsts_inv_pair2_aux" +"tsts_pair" +"tsts_refl" +"tsts_sym" +"tsts_trans" +"tw" +"tw_pos" +"unfold" +"unfold_bind" +"unfold_flat" +"unfold_lref" +"unfold_sort" diff --git a/matita/matita/contribs/lambdadelta/bin/roles/Makefile b/matita/matita/contribs/lambdadelta/bin/roles/Makefile new file mode 100644 index 000000000..779952bac --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/Makefile @@ -0,0 +1,10 @@ +EXECS = roles + +REQUIRES = + +include ../Makefile.common + +test: +# @$(MAKE) --no-print-directory -C ../../ www + +.PHONY: test diff --git a/matita/matita/contribs/lambdadelta/bin/roles/roles.ml b/matita/matita/contribs/lambdadelta/bin/roles/roles.ml new file mode 100644 index 000000000..1c7866e47 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/roles.ml @@ -0,0 +1,47 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +module EE = RolesEngine +module EG = RolesGlobal +module ET = RolesTypes +module EU = RolesUtils + +let help_C = " Set this working directory (default: current directory)" +let help_L = " Debug osn lexer" +let help_X = " Reset all options to defaults" +let help_r = " Load current status" +let help_s = " Start a stage with this version" +let help_t = " Toggle the selection of this pointed entry" +let help_w = " Save current status" +let help = "Usage: roles [ -LXrw | -C | -s | -t | ]*" + +let new_stage s = + EE.new_stage (EU.version_of_string s) + +let toggle_entry s = + EE.toggle_entry (EU.pointer_of_string s) + +let process s = + match Filename.extension s with + | ".txt" -> EE.read_waiting s + | x -> EU.raise_error (ET.EExt x) + +let _main = try + Arg.parse [ + "-C", Arg.String ((:=) EG.wd), help_C; + "-L", Arg.Set EG.debug_lexer, help_L; + "-X", Arg.Unit EG.clear, help_X; + "-r", Arg.Unit EE.read_status, help_r; + "-s", Arg.String new_stage, help_s; + "-t", Arg.String toggle_entry, help_t; + "-w", Arg.Unit EE.write_status, help_w; + ] process help +with ET.Error e -> Printf.eprintf "roles: %s\n%!" (EU.string_of_error e) diff --git a/matita/matita/contribs/lambdadelta/bin/roles/roles.mli b/matita/matita/contribs/lambdadelta/bin/roles/roles.mli new file mode 100644 index 000000000..77f896962 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/roles.mli @@ -0,0 +1,10 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.ml new file mode 100644 index 000000000..564f64d5b --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.ml @@ -0,0 +1,68 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +module EG = RolesGlobal +module EI = RolesInput +module EO = RolesOutput +module EU = RolesUtils +module ET = RolesTypes + +let st = EU.new_status + +let new_stage v = + if st.ET.w = [] then st.ET.s <- v + else EU.raise_error ET.ENews + +let toggle_entry = function + | [0] -> st.ET.r <- EU.list_toggle_all st.ET.r + | [0;m] -> st.ET.r <- EU.list_toggle m st.ET.r + | [0;m;1] -> + let r = EU.list_nth m st.ET.r in + r.ET.o <- EU.list_toggle_all r.ET.o + | [0;m;1;n] -> + let r = EU.list_nth m st.ET.r in + r.ET.o <- EU.list_toggle n r.ET.o + | [0;m;2] -> + let r = EU.list_nth m st.ET.r in + r.ET.n <- EU.list_toggle_all r.ET.n + | [0;m;2;n] -> + let r = EU.list_nth m st.ET.r in + r.ET.n <- EU.list_toggle n r.ET.n + | [1] -> st.ET.t <- EU.list_toggle_all st.ET.t + | [1;m] -> st.ET.t <- EU.list_toggle m st.ET.t + | [2] -> st.ET.w <- EU.list_toggle_all st.ET.w + | [2;m] -> st.ET.w <- EU.list_toggle m st.ET.w + | _ -> EU.raise_error ET.ENoEntry + +let read_waiting fname = + if st.ET.s = [] then EU.raise_error ET.ENoStage else + let ich = Scanf.Scanning.open_in fname in + let w = EI.read_names ich [] in + Scanf.Scanning.close_in ich; + let error n = ET.ENameClash n in + st.ET.w <- EU.list_union error EU.compare_names st.ET.w (List.rev w) + +let read_status () = + if st.ET.s <> [] then EU.raise_error (ET.EStage st.ET.s) else + let fname = Filename.concat !EG.wd "roles.osn" in + let ich = open_in fname in + let tmp = EI.read_status ich in + close_in ich; + st.ET.r <- tmp.ET.r; + st.ET.s <- tmp.ET.s; + st.ET.t <- tmp.ET.t; + st.ET.w <- tmp.ET.w + +let write_status () = + let fname = Filename.concat !EG.wd "roles.osn" in + let och = open_out fname in + EO.out_status och st; + close_out och diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.mli b/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.mli new file mode 100644 index 000000000..6671513f3 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesEngine.mli @@ -0,0 +1,20 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +val new_stage: RolesTypes.version -> unit + +val toggle_entry: RolesTypes.pointer -> unit + +val read_waiting: string -> unit + +val read_status: unit -> unit + +val write_status: unit -> unit diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.ml new file mode 100644 index 000000000..8a2679b6d --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.ml @@ -0,0 +1,22 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +let default_wd = "" + +let default_debug_lexer = false + +let wd = ref default_wd + +let debug_lexer = ref default_debug_lexer + +let clear () = + wd := default_wd; + debug_lexer := default_debug_lexer diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.mli b/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.mli new file mode 100644 index 000000000..9567cda81 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesGlobal.mli @@ -0,0 +1,16 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +val wd: string ref + +val debug_lexer: bool ref + +val clear: unit -> unit diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.ml new file mode 100644 index 000000000..93e8018d5 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.ml @@ -0,0 +1,28 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +module EL = RolesLexer +module EP = RolesParser +module EU = RolesUtils + +let input_string_opt ich = + let map s = Some s in + try Scanf.bscanf ich " %S" map + with End_of_file -> None + +let rec read_names ich names = + match input_string_opt ich with + | None -> names + | Some s -> read_names ich ((false,EU.name_of_string s)::names) + +let read_status ich = + let lexbuf = Lexing.from_channel ich in + EP.status EL.token lexbuf diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.mli b/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.mli new file mode 100644 index 000000000..d0756236f --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesInput.mli @@ -0,0 +1,14 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +val read_names: Scanf.Scanning.in_channel -> RolesTypes.names -> RolesTypes.names + +val read_status: in_channel -> RolesTypes.status diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesLexer.mll b/matita/matita/contribs/lambdadelta/bin/roles/rolesLexer.mll new file mode 100644 index 000000000..372446fc7 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesLexer.mll @@ -0,0 +1,41 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +{ + module EG = RolesGlobal + module EP = RolesParser + + let out s = if !EG.debug_lexer then prerr_endline s +} + +let SPC = ['\r' '\n' '\t' ' ']+ +let QT = "\"" +let TEXT = ['0'-'9' 'A'-'Z' 'a'-'z' '/' '.' '_']+ + +rule token = parse + | SPC { token lexbuf } + | QT { let s = text lexbuf in + out s; EP.TEXT s } + | ":" { out ":"; EP.SC } + | "(" { out "("; EP.OP } + | ")" { out ")"; EP.CP } + | "ver" as s { out s; EP.VER } + | "old" as s { out s; EP.OLD } + | "new" as s { out s; EP.NEW } + | "rel" as s { out s; EP.REL } + | "base" as s { out s; EP.BASE } + | "top" as s { out s; EP.TOP } + | "roles" as s { out s; EP.ROLES } + | eof { EP.EOF } + +and text = parse + | QT { "" } + | TEXT as s { s ^ text lexbuf } diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.ml new file mode 100644 index 000000000..cbac04b27 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.ml @@ -0,0 +1,56 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +module ET = RolesTypes +module EU = RolesUtils + +let indent n = + String.make (2*n) ' ' + +let out_tag i tag h map och l = + let aux och = List.iter (map (succ i) och) l in + if h then Printf.fprintf och "%s(%s%t)\n" (indent i) tag aux + else Printf.fprintf och "%s(%s\n%t%s)\n" (indent i) tag aux (indent i) + +let string_map f _i och x = + Printf.fprintf och " %S" (f x) + +let out_version i och v = + out_tag i "ver" true (string_map EU.string_of_version) och [v] + +let out_old i och os = + let map (_,o) = EU.string_of_obj o in + out_tag i "old" true (string_map map) och os + +let out_new i och ns = + let map (_,n) = EU.string_of_name n in + out_tag i "new" true (string_map map) och ns + +let out_role i och (_,r) = + let map i och r = + out_version i och r.ET.v; + out_old i och r.ET.o; + out_new i och r.ET.n + in + out_tag i "rel" false map och [r] + +let out_roles i och rs = + out_tag i "base" false out_role och rs + +let out_status och st = + let map i och st = + out_roles i och st.ET.r; + out_version i och st.ET.s; + out_old i och st.ET.t; + out_new i och st.ET.w + in + output_string och "roles:"; + out_tag 0 "top" false map och [st] diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.mli b/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.mli new file mode 100644 index 000000000..99b51f054 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesOutput.mli @@ -0,0 +1,12 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +val out_status: out_channel -> RolesTypes.status -> unit diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesParser.mly b/matita/matita/contribs/lambdadelta/bin/roles/rolesParser.mly new file mode 100644 index 000000000..1c92ba90e --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesParser.mly @@ -0,0 +1,78 @@ +/* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ */ + +%{ + module EU = RolesUtils + module ET = RolesTypes +%} + +%token EOF SC OP CP VER OLD NEW REL BASE TOP ROLES +%token TEXT + +%start status +%type status + +%% + +version: + | TEXT { EU.version_of_string $1 } +; + +obj: + | TEXT { false, EU.obj_of_string $1 } +; + +name: + | TEXT { false, EU.name_of_string $1 } +; + +role: + | OP REL ver olds news CP { + false, {ET.v = $3; ET.o = $4; ET.n = $5} + } +; + +objs: + | { [] } + | obj objs { $1 :: $2 } +; + +names: + | { [] } + | name names { $1 :: $2 } +; + +roles: + | { [] } + | role roles { $1 :: $2 } +; + +ver: + | OP VER version CP { $3 } +; + +olds: + | OP OLD objs CP { $3 } +; + +news: + | OP NEW names CP { $3 } +; + +base: + | OP BASE roles CP { $3 } +; + +status: + | ROLES SC OP TOP base ver olds news CP EOF { + {ET.r = $5; ET.s = $6; ET.t = $7; ET.w = $8} + } +; diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesTypes.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesTypes.ml new file mode 100644 index 000000000..ad97fe73a --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesTypes.ml @@ -0,0 +1,46 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +type version = int list + +type name = string list + +type names = (bool*name) list + +type obj = version * name + +type objs = (bool*obj) list + +type role = { + mutable v: version; + mutable o: objs; + mutable n: names; +} + +type roles = (bool*role) list + +type status = { + mutable r: roles; + mutable s: version; + mutable t: objs; + mutable w: names; +} + +type pointer = int list + +type error = EExt of string + | EStage of version + | ENoStage + | ENews + | ENameClash of name + | ENoEntry + +exception Error of error diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.ml b/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.ml new file mode 100644 index 000000000..e1631c1b9 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.ml @@ -0,0 +1,95 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +module ET = RolesTypes + +let raise_error e = + raise (ET.Error e) + +let list_union error compare l1 l2 = + let rec aux l1 l2 = match l1 with + | [] -> l2 + | hd1::tl1 -> match l2 with + | [] -> l1 + | hd2::tl2 -> + let b = compare (snd hd1) (snd hd2) in + if b > 0 then hd2 :: aux l1 tl2 + else if b < 0 then hd1 :: aux tl1 l2 + else raise_error (error (snd hd1)) + in + aux l1 l2 + +let list_compare compare l1 l2 = + let rec aux l1 l2 = match l1 with + | [] -> + if l2 = [] then 0 else -1 + | hd1::tl1 -> match l2 with + | [] -> 1 + | hd2::tl2 -> + let b = compare hd1 hd2 in + if b = 0 then aux tl1 tl2 else b + in + aux l1 l2 + +let rec list_nth n = function + | [] -> raise_error ET.ENoEntry + | (_,hd)::tl -> if n = 0 then hd else list_nth (pred n) tl + +let rec list_toggle n = function + | [] -> raise_error ET.ENoEntry + | (b,hd)::tl -> if n = 0 then (not b,hd)::tl else (b,hd)::list_toggle (pred n) tl + +let rec list_toggle_all = function + | [] -> [] + | (b,hd)::tl -> (not b,hd)::list_toggle_all tl + +let string_of_version v = + String.concat "." (List.map string_of_int v) + +let version_of_string s = + List.map int_of_string (String.split_on_char '.' s) + +let string_of_name n = + String.concat "_" n + +let name_of_string s = + String.split_on_char '_' s + +let compare_names n1 n2 = + list_compare compare n1 n2 + +let string_of_obj (v,n) = + Printf.sprintf "%s/%s" (string_of_version v) (string_of_name n) + +let obj_of_string s = + match String.split_on_char '/' s with + | [sv;sn] -> version_of_string sv, name_of_string sn + | _ -> failwith "obj_of_string" + +let new_status = { + ET.r = []; ET.s = []; ET.t = []; ET.w = []; +} + +let pointer_of_string = version_of_string + +let string_of_error = function + | ET.EExt x -> + Printf.sprintf "unknown input file type %S" x + | ET.EStage v -> + Printf.sprintf "current stage %S" (string_of_version v) + | ET.ENoStage -> + Printf.sprintf "current stage not defined" + | ET.ENews -> + Printf.sprintf "current stage not finished" + | ET.ENameClash n -> + Printf.sprintf "name clash %S" (string_of_name n) + | ET.ENoEntry -> + Printf.sprintf "entry not found" diff --git a/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.mli b/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.mli new file mode 100644 index 000000000..c67e03707 --- /dev/null +++ b/matita/matita/contribs/lambdadelta/bin/roles/rolesUtils.mli @@ -0,0 +1,41 @@ +(* + ||M|| This file is part of HELM, an Hypertextual, Electronic + ||A|| Library of Mathematics, developed at the Computer Science + ||T|| Department, University of Bologna, Italy. + ||I|| + ||T|| HELM is free software; you can redistribute it and/or + ||A|| modify it under the terms of the GNU General Public License + \ / version 2 or (at your option) any later version. + \ / This software is distributed as is, NO WARRANTY. + V_______________________________________________________________ *) + +val raise_error: RolesTypes.error -> 'a + +val list_union: ('a -> RolesTypes.error) -> ('a -> 'a -> int) -> + ('b*'a) list -> ('b*'a) list -> ('b*'a) list + +val list_nth: int -> ('a * 'b) list -> 'b + +val list_toggle: int -> (bool * 'b) list -> (bool * 'b) list + +val list_toggle_all: (bool * 'b) list -> (bool * 'b) list + +val string_of_version: RolesTypes.version -> string + +val version_of_string: string -> RolesTypes.version + +val string_of_name: RolesTypes.name -> string + +val name_of_string: string -> RolesTypes.name + +val compare_names: RolesTypes.name -> RolesTypes.name -> int + +val string_of_obj: RolesTypes.obj -> string + +val obj_of_string: string -> RolesTypes.obj + +val new_status: RolesTypes.status + +val pointer_of_string: string -> RolesTypes.pointer + +val string_of_error: RolesTypes.error -> string diff --git a/matita/matita/contribs/lambdadelta/static_2/names.txt b/matita/matita/contribs/lambdadelta/static_2/names.txt index 6af48b1ca..578529115 100644 --- a/matita/matita/contribs/lambdadelta/static_2/names.txt +++ b/matita/matita/contribs/lambdadelta/static_2/names.txt @@ -1,1276 +1,1276 @@ -aaa -aaa_aaa_inv_appl -aaa_aaa_inv_cast -aaa_abbr -aaa_abst -aaa_appl -aaa_cast -aaa_dec -aaa_feqx_conf -aaa_fqu_conf -aaa_fqup_conf -aaa_fquq_conf -aaa_fqus_conf -aaa_inv_abbr -aaa_inv_abbr_aux -aaa_inv_abst -aaa_inv_abst_aux -aaa_inv_appl -aaa_inv_appl_aux -aaa_inv_cast -aaa_inv_cast_aux -aaa_inv_gref -aaa_inv_gref_aux -aaa_inv_lifts -aaa_inv_lref -aaa_inv_lref_aux -aaa_inv_lref_drops -aaa_inv_sort -aaa_inv_sort_aux -aaa_inv_zero -aaa_inv_zero_aux -aaa_lifts -aaa_lref -aaa_lref_drops -aaa_mono -aaa_pair_inv_lref -aaa_sort -aaa_teqx_conf_reqx -aaa_zero -aarity -AAtom -Abbr -Abst -abst_dec -ac -ac_eq -ac_eq_props -ac_le -acle -acle_eq_le -acle_eq_monotonic_le -acle_le_eq -acle_le_monotonic_le -acle_omega -acle_one -ac_le_props -acle_refl -acle_trans -ac_props -acr -acr_aaa -acr_aaa_csubc_lifts -acr_abst -acr_gcr -acr_lifts -ac_top -ac_top_props -APair -append -append_assoc -append_atom -append_atom_sn -append_bind -append_inj_dx -append_inj_length_dx -append_inj_length_sn -append_inj_sn -append_inv_atom3_sn -append_inv_bind3_sn -append_inv_pair_dx -append_inv_refl_dx -append_length -append_shift -Appl -applv -applv_cons -applv_nil -applv_simple -apply_top -bind -bind1 -bind2 -Bind2 -BPair -BUnit -bw -bw_pos -candidate -Cast -cdeq -cdeq_ext -ceq -ceq_ext -ceq_ext_inv_eq -ceq_ext_refl -ceq_ext_trans -ceq_inv_lift_sn -ceq_lift_sn -cext2 -cext2_co -cext2_d_liftable2_sn -cext2_sym -cfull -cfull_dec -cfull_lift_sn -cfun -co_dedropable_sn -co_dedropable_sn_CTC -co_dedropable_sn_ltc -co_dropable_dx -co_dropable_dx_CTC -co_dropable_dx_ltc -co_dropable_sn -co_dropable_sn_CTC -co_dropable_sn_ltc -CP0 -CP1 -CP2 -CP3 -d1_liftable_liftable_all -d2_deliftable_sn_CTC -d2_deliftable_sn_ltc -d2_liftable_sn_CTC -d2_liftable_sn_ltc -d_appendable_sn -d_deliftable1 -d_deliftable1_isuni -d_deliftable2_bi -d_deliftable2_sn -d_deliftable2_sn_bi -dedropable_sn -dedropable_sn_CTC -deg_inv_prec -deg_inv_pred -deg_iter -deg_next_SO -deg_O -deg_SO -deg_SO_gt -deg_SO_inv_succ -deg_SO_inv_succ_aux -deg_SO_refl -deg_SO_succ -deg_SO_zero -deliftable2_bi -deliftable2_dx -deliftable2_sn -deliftable2_sn_bi -deliftable2_sn_dx -destruct_apair_apair_aux -destruct_lbind_lbind_aux -destruct_sort_sort_aux -destruct_tatom_tatom_aux -destruct_tpair_tpair_aux -discr_apair_xy_x -discr_apair_xy_y -discr_lbind_x_xy -discr_lbind_xy_x -discr_tpair_xy_x -discr_tpair_xy_y -d_liftable1 -d_liftable1_all -d_liftable1_isuni -d_liftable2_bi -d_liftable2_sn -d_liftable2_sn_bi -dropable_dx -dropable_dx_CTC -dropable_sn -dropable_sn_CTC -drops -drops_after_fwd_drop2 -drops_atom -drops_atom2_sex_conf -drops_atom_F -drops_bind2_fwd_rfw -drops_conf -drops_conf_div -drops_conf_div_bind_isuni -drops_conf_div_fcla -drops_conf_div_isuni -drops_conf_skip1 -drops_drop -drops_eq_repl_back -drops_eq_repl_fwd -drops_F -drops_fcla_fwd -drops_fcla_fwd_le2 -drops_fcla_fwd_lt2 -drops_fcla_fwd_lt4 -drops_F_uni -drops_fwd_drop2 -drops_fwd_drop2_aux -drops_fwd_fcla -drops_fwd_fcla_le2 -drops_fwd_fcla_lt2 -drops_fwd_isfin -drops_fwd_isid -drops_fwd_length_eq1 -drops_fwd_length_eq2 -drops_fwd_length_le4 -drops_fwd_lw -drops_fwd_lw_lt -drops_gen -drops_inv_atom1 -drops_inv_atom1_aux -drops_inv_atom2 -drops_inv_bind1_isuni -drops_inv_bind2_isuni -drops_inv_bind2_isuni_next -drops_inv_drop1 -drops_inv_drop1_aux -drops_inv_F -drops_inv_gen -drops_inv_isuni -drops_inv_length_eq -drops_inv_skip1 -drops_inv_skip1_aux -drops_inv_skip2 -drops_inv_skip2_aux -drops_inv_succ -drops_inv_TF -drops_inv_TF_aux -drops_inv_uni -drops_inv_x_bind_xy -drops_isuni_ex -drops_isuni_fwd_drop2 -drops_ldec_dec -drops_lsubc_trans -drops_mono -drops_refl -drops_seq_trans_next -drops_sex_trans_next -drops_sex_trans_push -drops_skip -drops_split_div -drops_split_trans -drops_split_trans_bind2 -drops_TF -drops_tls_at -drops_trans -drops_trans_skip2 -eq_aarity_dec -eq_bind1_dec -eq_bind2_dec -eq_bind_dec -eq_false_inv_tpair_dx -eq_false_inv_tpair_sn -eq_flat2_dec -eq_genv_dec -eq_item0_dec -eq_item2_dec -eq_lenv_dec -eq_term_dec -ext2 -ext2_dec -ext2_inv_pair -ext2_inv_pair_dx -ext2_inv_pair_dx_aux -ext2_inv_pair_sn -ext2_inv_pair_sn_aux -ext2_inv_tc -ext2_inv_unit -ext2_inv_unit_dx -ext2_inv_unit_dx_aux -ext2_inv_unit_sn -ext2_inv_unit_sn_aux -ext2_pair -ext2_refl -ext2_sym -ext2_tc -ext2_tc_inj -ext2_tc_pair -ext2_tc_step -ext2_trans -ext2_unit -f_dedropable_sn -f_dropable_dx -f_dropable_sn -feqx -feqx_canc_dx -feqx_canc_sn -feqx_fqus_trans -feqx_intro_dx -feqx_intro_sn -feqx_inv_gen_dx -feqx_inv_gen_sn -feqx_refl -feqx_sym -feqx_tneqx_repl_dx -feqx_trans -flat2 -Flat2 -fold -fold_atom -fold_pair -fold_unit -fqu -fqu_bind_dx -fqu_clear -fqu_drop -fqu_flat_dx -fqu_fqup -fqu_fquq -fqu_fwd_fw -fqu_fwd_length_lref1 -fqu_fwd_length_lref1_aux -fqu_gref -fqu_inv_atom1 -fqu_inv_bind1 -fqu_inv_bind1_aux -fqu_inv_bind1_true -fqu_inv_flat1 -fqu_inv_flat1_aux -fqu_inv_gref1 -fqu_inv_gref1_aux -fqu_inv_gref1_bind -fqu_inv_lref1 -fqu_inv_lref1_aux -fqu_inv_lref1_bind -fqu_inv_sort1 -fqu_inv_sort1_aux -fqu_inv_sort1_bind -fqu_inv_teqx -fqu_inv_teqx_aux -fqu_inv_zero1_pair -fqu_lref_O -fqu_lref_S -fqup -fqu_pair_sn -fqup_bind_dx -fqup_bind_dx_flat_dx -fqup_clear -fqup_drops_strap1 -fqup_drops_succ -fqup_flat_dx -fqup_flat_dx_bind_dx -fqup_flat_dx_pair_sn -fqup_fqus -fqup_fqus_trans -fqup_fwd_fw -fqup_ind -fqup_ind_dx -fqup_inv_step_sn -fqup_lref -fqup_pair_sn -fqup_strap1 -fqup_strap2 -fqup_trans -fqup_wf_ind -fqup_wf_ind_eq -fqup_zeta -fquq -fquq_fqus -fquq_fwd_fw -fquq_fwd_length_lref1 -fquq_refl -fqus -fqus_drops -fqus_fqup_trans -fqus_fwd_fw -fqus_ind -fqus_ind_dx -fqus_inv_atom1 -fqus_inv_bind1 -fqus_inv_bind1_true -fqus_inv_flat1 -fqus_inv_fqup -fqus_inv_fqu_sn -fqus_inv_gref1 -fqus_inv_gref1_bind -fqus_inv_lref1 -fqus_inv_lref1_bind -fqus_inv_refl_atom3 -fqus_inv_sort1 -fqus_inv_sort1_bind -fqus_inv_zero1_pair -fqu_sort -fqus_refl -fqus_strap1 -fqus_strap1_fqu -fqus_strap2 -fqus_strap2_fqu -fqus_trans -fqu_teqx_conf -fqu_wf_ind -frees -frees_append_void -frees_atom -frees_atom_drops -frees_bind -frees_bind_void -frees_eq_repl_back -frees_eq_repl_fwd -frees_flat -frees_fwd_coafter -frees_fwd_isfin -frees_gref -frees_ind_void -frees_inv_append_void -frees_inv_append_void_aux -frees_inv_atom -frees_inv_atom_aux -frees_inv_bind -frees_inv_bind_aux -frees_inv_bind_void -frees_inv_drops_next -frees_inv_flat -frees_inv_flat_aux -frees_inv_gref -frees_inv_gref_aux -frees_inv_lifts -frees_inv_lifts_ex -frees_inv_lifts_SO -frees_inv_lref -frees_inv_lref_aux -frees_inv_lref_drops -frees_inv_pair -frees_inv_pair_aux -frees_inv_sort -frees_inv_sort_aux -frees_inv_unit -frees_inv_unit_aux -frees_lifts -frees_lifts_SO -frees_lref -frees_lref_push -frees_lref_pushs -frees_mono -frees_pair -frees_pair_drops -frees_req_conf -frees_reqx_conf -frees_sex_conf -frees_sort -frees_teqx_conf -frees_teqx_conf_reqx -frees_total -frees_unit -frees_unit_drops -fsge_rex_trans -fsle -fsle_bind -fsle_bind_dx_dx -fsle_bind_dx_sn -fsle_bind_eq -fsle_bind_sn_ge -fsle_flat -fsle_flat_dx_dx -fsle_flat_dx_sn -fsle_flat_sn -fsle_frees_trans -fsle_frees_trans_eq -fsle_fwd_pair_sn -fsle_gref -fsle_gref_bi -fsle_inv_frees_eq -fsle_inv_lifts_sn -fsle_lifts_dx -fsle_lifts_sn -fsle_lifts_SO -fsle_lifts_SO_sn -fsle_pair_bi -fsle_refl -fsle_shift -fsle_sort -fsle_sort_bi -fsle_trans_dx -fsle_trans_rc -fsle_trans_sn -fsle_unit_bi -f_transitive_next -fw -fw_clear -fw_lpair_sn -fw_shift -fw_tpair_dx -fw_tpair_sn -GAtom -gcp -gcp2_all -gcr -gcr_aaa -genv -glength -GPair -GRef -gw -gw_pair -is_apear_dec -is_lifts_dec -item0 -item2 -LAtom -LBind -length -length_atom -length_bind -length_inv_succ_dx -length_inv_succ_dx_ltail -length_inv_succ_sn -length_inv_succ_sn_ltail -length_inv_zero_dx -length_inv_zero_sn -lenv -lenv_case_tail -lenv_ind_tail -lex -lex_atom -lex_bind -lex_bind_refl_dx -lex_co -lex_conf -lex_confluent -lex_CTC -lex_CTC_ind_dx -lex_CTC_ind_sn -lex_CTC_inj -lex_CTC_step_dx -lex_CTC_step_sn -lex_dropable_dx -lex_dropable_sn -lex_drops_conf_pair -lex_drops_trans_pair -lex_fwd_length -lex_ind -lex_inv_atom_dx -lex_inv_atom_sn -lex_inv_bind_dx -lex_inv_bind_sn -lex_inv_CTC -lex_inv_pair -lex_inv_pair_dx -lex_inv_pair_sn -lex_inv_unit_dx -lex_inv_unit_sn -lex_liftable_dedropable_sn -lex_pair -lex_refl -lex_trans -lex_transitive -lex_unit -liftable2_bi -liftable2_dx -liftable2_sn -liftable2_sn_bi -liftable2_sn_dx -lifts -lifts_applv -liftsb -liftsb_conf -liftsb_div3 -liftsb_eq_repl_back -liftsb_fwd_bw -liftsb_fwd_isid -lifts_bind -liftsb_inj -liftsb_inv_pair_dx -liftsb_inv_pair_sn -liftsb_inv_unit_dx -liftsb_inv_unit_sn -liftsb_mono -liftsb_refl -liftsb_split_trans -liftsb_total -liftsb_trans -lifts_conf -lifts_div3 -lifts_div4 -lifts_div4_one -lifts_eq_repl_back -lifts_eq_repl_fwd -lifts_flat -lifts_fwd_isid -lifts_fwd_pair1 -lifts_fwd_pair2 -lifts_fwd_tw -lifts_gref -lifts_inj -lifts_inv_applv1 -lifts_inv_applv2 -lifts_inv_atom1 -lifts_inv_atom2 -lifts_inv_bind1 -lifts_inv_bind1_aux -lifts_inv_bind2 -lifts_inv_bind2_aux -lifts_inv_flat1 -lifts_inv_flat1_aux -lifts_inv_flat2 -lifts_inv_flat2_aux -lifts_inv_gref1 -lifts_inv_gref1_aux -lifts_inv_gref2 -lifts_inv_gref2_aux -lifts_inv_lref1 -lifts_inv_lref1_aux -lifts_inv_lref1_uni -lifts_inv_lref2 -lifts_inv_lref2_aux -lifts_inv_lref2_uni -lifts_inv_lref2_uni_ge -lifts_inv_lref2_uni_lt -lifts_inv_pair_xy_x -lifts_inv_pair_xy_y -lifts_inv_push_succ_sn -lifts_inv_push_zero_sn -lifts_inv_sort1 -lifts_inv_sort1_aux -lifts_inv_sort2 -lifts_inv_sort2_aux -lifts_lref -lifts_lref_ge -lifts_lref_ge_minus -lifts_lref_lt -lifts_lref_uni -lifts_mono -lifts_push_lref -lifts_push_zero -lifts_refl -lifts_simple_dx -lifts_simple_sn -lifts_sort -lifts_split_div -lifts_split_trans -lifts_total -lifts_trans -lifts_trans4_one -lifts_trans_uni -lifts_uni -liftsv -liftsv_cons -liftsv_inj -liftsv_inv_cons1 -liftsv_inv_cons1_aux -liftsv_inv_cons2 -liftsv_inv_cons2_aux -liftsv_inv_nil1 -liftsv_inv_nil1_aux -liftsv_inv_nil2 -liftsv_inv_nil2_aux -liftsv_mono -liftsv_nil -liftsv_split_trans -liftsv_total -liftsv_trans -LRef -lsuba -lsuba_aaa_conf -lsuba_aaa_trans -lsuba_atom -lsuba_beta -lsuba_bind -lsuba_drops_conf_isuni -lsuba_drops_trans_isuni -lsuba_fwd_lsubr -lsuba_inv_atom1 -lsuba_inv_atom1_aux -lsuba_inv_atom2 -lsuba_inv_atom2_aux -lsuba_inv_bind1 -lsuba_inv_bind1_aux -lsuba_inv_bind2 -lsuba_inv_bind2_aux -lsuba_lsubc -lsuba_refl -lsuba_trans -lsubc -lsubc_atom -lsubc_beta -lsubc_bind -lsubc_drops_trans_isuni -lsubc_fwd_lsubr -lsubc_inv_atom1 -lsubc_inv_atom1_aux -lsubc_inv_atom2 -lsubc_inv_atom2_aux -lsubc_inv_bind1 -lsubc_inv_bind1_aux -lsubc_inv_bind2 -lsubc_inv_bind2_aux -lsubc_refl -lsubf -lsubf_atom -lsubf_beta -lsubf_beta_tl_dx -lsubf_bind -lsubf_bind_tl_dx -lsubf_eq_repl_back1 -lsubf_eq_repl_back2 -lsubf_eq_repl_fwd1 -lsubf_eq_repl_fwd2 -lsubf_frees_trans -lsubf_fwd_bind_tl -lsubf_fwd_isid_dx -lsubf_fwd_isid_sn -lsubf_fwd_lsubr_isdiv -lsubf_fwd_sle -lsubf_inv_atom -lsubf_inv_atom1 -lsubf_inv_atom1_aux -lsubf_inv_atom2 -lsubf_inv_atom2_aux -lsubf_inv_beta_sn -lsubf_inv_bind_sn -lsubf_inv_pair1 -lsubf_inv_pair1_aux -lsubf_inv_pair2 -lsubf_inv_pair2_aux -lsubf_inv_push1 -lsubf_inv_push1_aux -lsubf_inv_push2 -lsubf_inv_push2_aux -lsubf_inv_push_sn -lsubf_inv_refl -lsubf_inv_sor_dx -lsubf_inv_unit1 -lsubf_inv_unit1_aux -lsubf_inv_unit2 -lsubf_inv_unit2_aux -lsubf_inv_unit_sn -lsubf_push -lsubf_refl -lsubf_refl_eq -lsubf_sor -lsubf_unit -lsubr -lsubr_atom -lsubr_beta -lsubr_bind -lsubr_fwd_bind1 -lsubr_fwd_bind2 -lsubr_fwd_drops2_abbr -lsubr_fwd_drops2_bind -lsubr_fwd_length -lsubr_inv_abbr2 -lsubr_inv_abst1 -lsubr_inv_abst2 -lsubr_inv_atom1 -lsubr_inv_atom1_aux -lsubr_inv_atom2 -lsubr_inv_atom2_aux -lsubr_inv_bind1 -lsubr_inv_bind1_aux -lsubr_inv_bind2 -lsubr_inv_bind2_aux -lsubr_inv_pair2 -lsubr_inv_unit1 -lsubr_inv_unit2 -lsubr_lsubf -lsubr_lsubf_isid -lsubr_refl -lsubr_trans -lsubr_unit -ltail_length -lveq -lveq_atom -lveq_bind -lveq_fwd_abst_bind_length_le -lveq_fwd_bind_abst_length_le -lveq_fwd_gen -lveq_fwd_length -lveq_fwd_length_eq -lveq_fwd_length_le_dx -lveq_fwd_length_le_sn -lveq_fwd_length_minus -lveq_fwd_length_plus -lveq_fwd_pair_dx -lveq_fwd_pair_sn -lveq_inj -lveq_inj_length -lveq_inj_void_dx_le -lveq_inj_void_sn_ge -lveq_inv_atom_atom -lveq_inv_atom_bind -lveq_inv_bind -lveq_inv_bind_atom -lveq_inv_bind_O -lveq_inv_pair_pair -lveq_inv_succ -lveq_inv_succ_aux -lveq_inv_succ_dx -lveq_inv_succ_sn -lveq_inv_succ_sn_aux -lveq_inv_void_dx_length -lveq_inv_void_sn_length -lveq_inv_void_succ_dx -lveq_inv_void_succ_sn -lveq_inv_zero -lveq_inv_zero_aux -lveq_length_eq -lveq_length_fwd_dx -lveq_length_fwd_sn -lveq_refl -lveq_sym -lveq_void_dx -lveq_void_sn -lw -lw_bind -mk_ac -mk_ac_props -mk_gcp -mk_gcr -mk_sd -mk_sd_props -mk_sh -mk_sh_acyclic -mk_sh_decidable -mk_sh_lt -nexts_le -nexts_lt -nf -R_confluent2_rex -req -req_feqx_trans -req_fsle_comp -req_fwd_rex -req_inv_bind -req_inv_flat -req_inv_lifts_bi -req_inv_lref_bind_dx -req_inv_lref_bind_sn -req_inv_zero_pair_dx -req_inv_zero_pair_sn -req_refl -req_reqx -req_reqx_trans -req_rex_trans -req_transitive -reqx -reqx_atom -reqx_bind -reqx_bind_repl_dx -reqx_bind_void -reqx_canc_dx -reqx_canc_sn -reqx_dec -reqx_flat -reqx_fqup_trans -reqx_fquq_trans -reqx_fqus_trans -reqx_fqu_trans -reqx_fsge_comp -reqx_fwd_bind_dx -reqx_fwd_bind_dx_void -reqx_fwd_dx -reqx_fwd_flat_dx -reqx_fwd_length -reqx_fwd_pair_sn -reqx_fwd_zero_pair -reqx_gref -reqx_gref_length -reqx_inv_atom_dx -reqx_inv_atom_sn -reqx_inv_bind -reqx_inv_bind_void -reqx_inv_flat -reqx_inv_lifts_bi -reqx_inv_lifts_dx -reqx_inv_lifts_sn -reqx_inv_lref -reqx_inv_lref_bind_dx -reqx_inv_lref_bind_sn -reqx_inv_lref_pair_bi -reqx_inv_lref_pair_dx -reqx_inv_lref_pair_sn -reqx_inv_zero -reqx_inv_zero_pair_dx -reqx_inv_zero_pair_sn -reqx_lifts_bi -reqx_lifts_sn -reqx_lref -reqx_pair -reqx_pair_refl -reqx_refl -reqx_repl -reqx_rneqx_trans -reqx_sort -reqx_sort_length -reqx_sym -reqx_trans -reqx_unit -reqx_unit_length -rex -rex_atom -rex_bind -rex_bind_dx_split -rex_bind_dx_split_void -rex_bind_repl_dx -rex_bind_void -rex_co -rex_conf -rex_confluent -rex_dec -rex_dropable_dx -rex_dropable_sn -rex_flat -rex_flat_dx_split -rex_fsge_compatible -rex_fsle_compatible -rex_fwd_bind_dx -rex_fwd_bind_dx_void -rex_fwd_dx -rex_fwd_flat_dx -rex_fwd_length -rex_fwd_pair_sn -rex_fwd_zero_pair -rex_gref -rex_gref_length -rex_inv_atom_dx -rex_inv_atom_sn -rex_inv_bind -rex_inv_bind_void -rex_inv_flat -rex_inv_frees -rex_inv_gref -rex_inv_gref_bind_dx -rex_inv_gref_bind_sn -rex_inv_lex_req -rex_inv_lifts_bi -rex_inv_lref -rex_inv_lref_bind_dx -rex_inv_lref_bind_sn -rex_inv_lref_pair_bi -rex_inv_lref_pair_dx -rex_inv_lref_pair_sn -rex_inv_lref_unit_dx -rex_inv_lref_unit_sn -rex_inv_sort -rex_inv_sort_bind_dx -rex_inv_sort_bind_sn -rex_inv_zero -rex_inv_zero_length -rex_inv_zero_pair_dx -rex_inv_zero_pair_sn -rex_inv_zero_unit_dx -rex_inv_zero_unit_sn -rex_isid -rex_lex -rex_liftable_dedropable_sn -rex_lifts_bi -rex_lref -rex_pair -rex_pair_refl -rex_pair_sn_split -rex_refl -rexs -rexs_atom -rexs_co -rexs_fwd_bind_dx -rexs_fwd_bind_dx_void -rexs_fwd_flat_dx -rexs_fwd_length -rexs_fwd_pair_sn -rexs_gref -rexs_ind_dx -rexs_ind_sn -rexs_inv_atom_dx -rexs_inv_atom_sn -rexs_inv_bind -rexs_inv_bind_void -rexs_inv_flat -rexs_inv_gref -rexs_inv_gref_bind_dx -rexs_inv_gref_bind_sn -rexs_inv_lex_req -rexs_inv_sort -rexs_inv_sort_bind_dx -rexs_inv_sort_bind_sn -rexs_lex -rexs_lex_req -rexs_lref -rex_sort -rex_sort_length -rexs_pair -rexs_pair_refl -rexs_refl -rexs_sort -rexs_step_dx -rexs_step_sn -rexs_sym -rexs_tc -rexs_trans -rexs_unit -rex_sym -rex_trans_fsle -rex_transitive -rex_trans_next -rex_unit -rex_unit_length -rex_unit_sn -R_fsge_compatible -rfw -rfw_clear -rfw_lpair_dx -rfw_lpair_sn -rfw_shift -rfw_tpair_dx -rfw_tpair_sn -rneqx_inv_bind -rneqx_inv_bind_void -rneqx_inv_flat -rneqx_reqx_canc_dx -rneqx_reqx_div -rnex_inv_bind -rnex_inv_bind_void -rnex_inv_flat -R_pw_confluent2_sex -S1 -S2 -S3 -S5 -S6 -S7 -sd -sd_d -sd_d_correct -sd_d_props -sd_d_SS -sd_O -sd_O_props -sd_props -sd_SO -sd_SO_props -seq -seq_canc_dx -seq_canc_sn -seq_co_dedropable_sn -seq_co_dropable_dx -seq_co_dropable_sn -seq_drops_conf_next -seq_drops_trans_next -seq_eq_repl_back -seq_eq_repl_fwd -seq_fwd_length -seq_inv_atom1 -seq_inv_atom2 -seq_inv_next -seq_inv_next1 -seq_inv_next2 -seq_inv_push -seq_inv_push1 -seq_inv_push2 -seq_inv_tl -seq_join -seq_meet -seq_refl -seq_sym -seq_trans -sex -sex_atom -sex_canc_dx -sex_canc_sn -sex_co -sex_co_dropable_dx -sex_co_dropable_sn -sex_co_isid -sex_conf -sex_dec -sex_dropable_dx_aux -sex_drops_conf_next -sex_drops_conf_push -sex_drops_trans_next -sex_drops_trans_push -sex_eq_repl_back -sex_eq_repl_fwd -sex_fwd_bind -sex_fwd_length -sex_inv_atom1 -sex_inv_atom1_aux -sex_inv_atom2 -sex_inv_atom2_aux -sex_inv_next -sex_inv_next1 -sex_inv_next1_aux -sex_inv_next2 -sex_inv_next2_aux -sex_inv_push -sex_inv_push1 -sex_inv_push1_aux -sex_inv_push2 -sex_inv_push2_aux -sex_inv_tc_dx -sex_inv_tc_sn -sex_inv_tl -sex_join -sex_length_cfull -sex_length_isid -sex_liftable_co_dedropable_bi -sex_liftable_co_dedropable_sn -sex_meet -sex_next -sex_pair_repl -sex_push -sex_refl -sex_sdj -sex_sdj_split -sex_sle_split -sex_sym -sex_tc_dx -sex_tc_inj_dx -sex_tc_inj_sn -sex_tc_next -sex_tc_next_dx -sex_tc_next_sn -sex_tc_push -sex_tc_push_dx -sex_tc_push_sn -sex_tc_refl -sex_tc_step_dx -sex_trans -sex_trans_gen -sex_trans_id_cfull -sex_transitive -sh -sh_acyclic -sh_decidable -sh_lt -sh_lt_acyclic -sh_lt_dec -sh_lt_nexts_inv_lt -simple -simple_atom -simple_dec_ex -simple_flat -simple_inv_bind -simple_inv_bind_aux -simple_inv_pair -simple_teqo_repl_dx -simple_teqo_repl_sn -sle_seq_trans -sle_sex_conf -sle_sex_trans -Sort -s_rs_transitive_isid -s_rs_transitive_lex_inv_isid -TAtom -tc_f_dedropable_sn -tc_f_dropable_dx -tc_f_dropable_sn -teqo -teqo_canc_dx -teqo_canc_sn -teqo_dec -teqo_gref -teqo_inv_applv_bind_simple -teqo_inv_gref1 -teqo_inv_gref1_aux -teqo_inv_lifts_bi -teqo_inv_lref1 -teqo_inv_lref1_aux -teqo_inv_pair -teqo_inv_pair1 -teqo_inv_pair1_aux -teqo_inv_pair2 -teqo_inv_pair2_aux -teqo_inv_sort1 -teqo_inv_sort1_aux -teqo_lifts_bi -teqo_lifts_dx -teqo_lifts_sn -teqo_lref -teqo_pair -teqo_refl -teqo_sort -teqo_sym -teqo_trans -teqx -teqx_canc_dx -teqx_canc_sn -teqx_dec -teqx_ext -teqx_feqx -teqx_fqup_trans -teqx_fquq_trans -teqx_fqus_trans -teqx_fqu_trans -teqx_fwd_atom1 -teqx_gref -teqx_inv_gref1 -teqx_inv_gref1_aux -teqx_inv_lifts_bi -teqx_inv_lifts_dx -teqx_inv_lifts_sn -teqx_inv_lref1 -teqx_inv_lref1_aux -teqx_inv_pair -teqx_inv_pair1 -teqx_inv_pair1_aux -teqx_inv_pair2 -teqx_inv_pair_xy_x -teqx_inv_pair_xy_y -teqx_inv_sort1 -teqx_inv_sort1_aux -teqx_inv_sort2 -teqx_lifts_bi -teqx_lifts_dx -teqx_lifts_inv_pair_sn -teqx_lifts_sn -teqx_lref -teqx_pair -teqx_refl -teqx_repl -teqx_reqx_conf -teqx_reqx_div -teqx_rex_conf -teqx_rex_div -teqx_sort -teqx_sym -teqx_teqo -teqx_tneqx_trans -teqx_trans -teqx_tweq -term -tneqx_inv_pair -tneqx_teqx_canc_dx -TPair -tw -tweq -tweq_abbr -tweq_abbr_neg -tweq_abbr_pos -tweq_abst -tweq_appl -tweq_canc_dx -tweq_canc_sn -tweq_cast -tweq_dec -tweq_fwd_pair_bi -tweq_fwd_pair_sn -tweq_gref -tweq_inv_abbr_neg_sn -tweq_inv_abbr_pos_bi -tweq_inv_abbr_pos_sn -tweq_inv_abbr_pos_x_lifts_y_y -tweq_inv_abbr_sn -tweq_inv_abbr_sn_aux -tweq_inv_abst_sn -tweq_inv_abst_sn_aux -tweq_inv_appl_bi -tweq_inv_appl_sn -tweq_inv_appl_sn_aux -tweq_inv_cast_bi -tweq_inv_cast_sn -tweq_inv_cast_sn_aux -tweq_inv_cast_xy_y -tweq_inv_gref_sn -tweq_inv_gref_sn_aux -tweq_inv_lifts_bi -tweq_inv_lref_sn -tweq_inv_lref_sn_aux -tweq_inv_sort_sn -tweq_inv_sort_sn_aux -tweq_lifts_bi -tweq_lifts_dx -tweq_lifts_sn -tweq_lref -tweq_refl -tweq_repl -tweq_simple_trans -tweq_sort -tweq_sym -tweq_trans -tw_le_pair_dx -tw_pos -Void +"aaa" +"aaa_aaa_inv_appl" +"aaa_aaa_inv_cast" +"aaa_abbr" +"aaa_abst" +"aaa_appl" +"aaa_cast" +"aaa_dec" +"aaa_feqx_conf" +"aaa_fqu_conf" +"aaa_fqup_conf" +"aaa_fquq_conf" +"aaa_fqus_conf" +"aaa_inv_abbr" +"aaa_inv_abbr_aux" +"aaa_inv_abst" +"aaa_inv_abst_aux" +"aaa_inv_appl" +"aaa_inv_appl_aux" +"aaa_inv_cast" +"aaa_inv_cast_aux" +"aaa_inv_gref" +"aaa_inv_gref_aux" +"aaa_inv_lifts" +"aaa_inv_lref" +"aaa_inv_lref_aux" +"aaa_inv_lref_drops" +"aaa_inv_sort" +"aaa_inv_sort_aux" +"aaa_inv_zero" +"aaa_inv_zero_aux" +"aaa_lifts" +"aaa_lref" +"aaa_lref_drops" +"aaa_mono" +"aaa_pair_inv_lref" +"aaa_sort" +"aaa_teqx_conf_reqx" +"aaa_zero" +"aarity" +"AAtom" +"Abbr" +"Abst" +"abst_dec" +"ac" +"ac_eq" +"ac_eq_props" +"ac_le" +"acle" +"acle_eq_le" +"acle_eq_monotonic_le" +"acle_le_eq" +"acle_le_monotonic_le" +"acle_omega" +"acle_one" +"ac_le_props" +"acle_refl" +"acle_trans" +"ac_props" +"acr" +"acr_aaa" +"acr_aaa_csubc_lifts" +"acr_abst" +"acr_gcr" +"acr_lifts" +"ac_top" +"ac_top_props" +"APair" +"append" +"append_assoc" +"append_atom" +"append_atom_sn" +"append_bind" +"append_inj_dx" +"append_inj_length_dx" +"append_inj_length_sn" +"append_inj_sn" +"append_inv_atom3_sn" +"append_inv_bind3_sn" +"append_inv_pair_dx" +"append_inv_refl_dx" +"append_length" +"append_shift" +"Appl" +"applv" +"applv_cons" +"applv_nil" +"applv_simple" +"apply_top" +"bind" +"bind1" +"bind2" +"Bind2" +"BPair" +"BUnit" +"bw" +"bw_pos" +"candidate" +"Cast" +"cdeq" +"cdeq_ext" +"ceq" +"ceq_ext" +"ceq_ext_inv_eq" +"ceq_ext_refl" +"ceq_ext_trans" +"ceq_inv_lift_sn" +"ceq_lift_sn" +"cext2" +"cext2_co" +"cext2_d_liftable2_sn" +"cext2_sym" +"cfull" +"cfull_dec" +"cfull_lift_sn" +"cfun" +"co_dedropable_sn" +"co_dedropable_sn_CTC" +"co_dedropable_sn_ltc" +"co_dropable_dx" +"co_dropable_dx_CTC" +"co_dropable_dx_ltc" +"co_dropable_sn" +"co_dropable_sn_CTC" +"co_dropable_sn_ltc" +"CP0" +"CP1" +"CP2" +"CP3" +"d1_liftable_liftable_all" +"d2_deliftable_sn_CTC" +"d2_deliftable_sn_ltc" +"d2_liftable_sn_CTC" +"d2_liftable_sn_ltc" +"d_appendable_sn" +"d_deliftable1" +"d_deliftable1_isuni" +"d_deliftable2_bi" +"d_deliftable2_sn" +"d_deliftable2_sn_bi" +"dedropable_sn" +"dedropable_sn_CTC" +"deg_inv_prec" +"deg_inv_pred" +"deg_iter" +"deg_next_SO" +"deg_O" +"deg_SO" +"deg_SO_gt" +"deg_SO_inv_succ" +"deg_SO_inv_succ_aux" +"deg_SO_refl" +"deg_SO_succ" +"deg_SO_zero" +"deliftable2_bi" +"deliftable2_dx" +"deliftable2_sn" +"deliftable2_sn_bi" +"deliftable2_sn_dx" +"destruct_apair_apair_aux" +"destruct_lbind_lbind_aux" +"destruct_sort_sort_aux" +"destruct_tatom_tatom_aux" +"destruct_tpair_tpair_aux" +"discr_apair_xy_x" +"discr_apair_xy_y" +"discr_lbind_x_xy" +"discr_lbind_xy_x" +"discr_tpair_xy_x" +"discr_tpair_xy_y" +"d_liftable1" +"d_liftable1_all" +"d_liftable1_isuni" +"d_liftable2_bi" +"d_liftable2_sn" +"d_liftable2_sn_bi" +"dropable_dx" +"dropable_dx_CTC" +"dropable_sn" +"dropable_sn_CTC" +"drops" +"drops_after_fwd_drop2" +"drops_atom" +"drops_atom2_sex_conf" +"drops_atom_F" +"drops_bind2_fwd_rfw" +"drops_conf" +"drops_conf_div" +"drops_conf_div_bind_isuni" +"drops_conf_div_fcla" +"drops_conf_div_isuni" +"drops_conf_skip1" +"drops_drop" +"drops_eq_repl_back" +"drops_eq_repl_fwd" +"drops_F" +"drops_fcla_fwd" +"drops_fcla_fwd_le2" +"drops_fcla_fwd_lt2" +"drops_fcla_fwd_lt4" +"drops_F_uni" +"drops_fwd_drop2" +"drops_fwd_drop2_aux" +"drops_fwd_fcla" +"drops_fwd_fcla_le2" +"drops_fwd_fcla_lt2" +"drops_fwd_isfin" +"drops_fwd_isid" +"drops_fwd_length_eq1" +"drops_fwd_length_eq2" +"drops_fwd_length_le4" +"drops_fwd_lw" +"drops_fwd_lw_lt" +"drops_gen" +"drops_inv_atom1" +"drops_inv_atom1_aux" +"drops_inv_atom2" +"drops_inv_bind1_isuni" +"drops_inv_bind2_isuni" +"drops_inv_bind2_isuni_next" +"drops_inv_drop1" +"drops_inv_drop1_aux" +"drops_inv_F" +"drops_inv_gen" +"drops_inv_isuni" +"drops_inv_length_eq" +"drops_inv_skip1" +"drops_inv_skip1_aux" +"drops_inv_skip2" +"drops_inv_skip2_aux" +"drops_inv_succ" +"drops_inv_TF" +"drops_inv_TF_aux" +"drops_inv_uni" +"drops_inv_x_bind_xy" +"drops_isuni_ex" +"drops_isuni_fwd_drop2" +"drops_ldec_dec" +"drops_lsubc_trans" +"drops_mono" +"drops_refl" +"drops_seq_trans_next" +"drops_sex_trans_next" +"drops_sex_trans_push" +"drops_skip" +"drops_split_div" +"drops_split_trans" +"drops_split_trans_bind2" +"drops_TF" +"drops_tls_at" +"drops_trans" +"drops_trans_skip2" +"eq_aarity_dec" +"eq_bind1_dec" +"eq_bind2_dec" +"eq_bind_dec" +"eq_false_inv_tpair_dx" +"eq_false_inv_tpair_sn" +"eq_flat2_dec" +"eq_genv_dec" +"eq_item0_dec" +"eq_item2_dec" +"eq_lenv_dec" +"eq_term_dec" +"ext2" +"ext2_dec" +"ext2_inv_pair" +"ext2_inv_pair_dx" +"ext2_inv_pair_dx_aux" +"ext2_inv_pair_sn" +"ext2_inv_pair_sn_aux" +"ext2_inv_tc" +"ext2_inv_unit" +"ext2_inv_unit_dx" +"ext2_inv_unit_dx_aux" +"ext2_inv_unit_sn" +"ext2_inv_unit_sn_aux" +"ext2_pair" +"ext2_refl" +"ext2_sym" +"ext2_tc" +"ext2_tc_inj" +"ext2_tc_pair" +"ext2_tc_step" +"ext2_trans" +"ext2_unit" +"f_dedropable_sn" +"f_dropable_dx" +"f_dropable_sn" +"feqx" +"feqx_canc_dx" +"feqx_canc_sn" +"feqx_fqus_trans" +"feqx_intro_dx" +"feqx_intro_sn" +"feqx_inv_gen_dx" +"feqx_inv_gen_sn" +"feqx_refl" +"feqx_sym" +"feqx_tneqx_repl_dx" +"feqx_trans" +"flat2" +"Flat2" +"fold" +"fold_atom" +"fold_pair" +"fold_unit" +"fqu" +"fqu_bind_dx" +"fqu_clear" +"fqu_drop" +"fqu_flat_dx" +"fqu_fqup" +"fqu_fquq" +"fqu_fwd_fw" +"fqu_fwd_length_lref1" +"fqu_fwd_length_lref1_aux" +"fqu_gref" +"fqu_inv_atom1" +"fqu_inv_bind1" +"fqu_inv_bind1_aux" +"fqu_inv_bind1_true" +"fqu_inv_flat1" +"fqu_inv_flat1_aux" +"fqu_inv_gref1" +"fqu_inv_gref1_aux" +"fqu_inv_gref1_bind" +"fqu_inv_lref1" +"fqu_inv_lref1_aux" +"fqu_inv_lref1_bind" +"fqu_inv_sort1" +"fqu_inv_sort1_aux" +"fqu_inv_sort1_bind" +"fqu_inv_teqx" +"fqu_inv_teqx_aux" +"fqu_inv_zero1_pair" +"fqu_lref_O" +"fqu_lref_S" +"fqup" +"fqu_pair_sn" +"fqup_bind_dx" +"fqup_bind_dx_flat_dx" +"fqup_clear" +"fqup_drops_strap1" +"fqup_drops_succ" +"fqup_flat_dx" +"fqup_flat_dx_bind_dx" +"fqup_flat_dx_pair_sn" +"fqup_fqus" +"fqup_fqus_trans" +"fqup_fwd_fw" +"fqup_ind" +"fqup_ind_dx" +"fqup_inv_step_sn" +"fqup_lref" +"fqup_pair_sn" +"fqup_strap1" +"fqup_strap2" +"fqup_trans" +"fqup_wf_ind" +"fqup_wf_ind_eq" +"fqup_zeta" +"fquq" +"fquq_fqus" +"fquq_fwd_fw" +"fquq_fwd_length_lref1" +"fquq_refl" +"fqus" +"fqus_drops" +"fqus_fqup_trans" +"fqus_fwd_fw" +"fqus_ind" +"fqus_ind_dx" +"fqus_inv_atom1" +"fqus_inv_bind1" +"fqus_inv_bind1_true" +"fqus_inv_flat1" +"fqus_inv_fqup" +"fqus_inv_fqu_sn" +"fqus_inv_gref1" +"fqus_inv_gref1_bind" +"fqus_inv_lref1" +"fqus_inv_lref1_bind" +"fqus_inv_refl_atom3" +"fqus_inv_sort1" +"fqus_inv_sort1_bind" +"fqus_inv_zero1_pair" +"fqu_sort" +"fqus_refl" +"fqus_strap1" +"fqus_strap1_fqu" +"fqus_strap2" +"fqus_strap2_fqu" +"fqus_trans" +"fqu_teqx_conf" +"fqu_wf_ind" +"frees" +"frees_append_void" +"frees_atom" +"frees_atom_drops" +"frees_bind" +"frees_bind_void" +"frees_eq_repl_back" +"frees_eq_repl_fwd" +"frees_flat" +"frees_fwd_coafter" +"frees_fwd_isfin" +"frees_gref" +"frees_ind_void" +"frees_inv_append_void" +"frees_inv_append_void_aux" +"frees_inv_atom" +"frees_inv_atom_aux" +"frees_inv_bind" +"frees_inv_bind_aux" +"frees_inv_bind_void" +"frees_inv_drops_next" +"frees_inv_flat" +"frees_inv_flat_aux" +"frees_inv_gref" +"frees_inv_gref_aux" +"frees_inv_lifts" +"frees_inv_lifts_ex" +"frees_inv_lifts_SO" +"frees_inv_lref" +"frees_inv_lref_aux" +"frees_inv_lref_drops" +"frees_inv_pair" +"frees_inv_pair_aux" +"frees_inv_sort" +"frees_inv_sort_aux" +"frees_inv_unit" +"frees_inv_unit_aux" +"frees_lifts" +"frees_lifts_SO" +"frees_lref" +"frees_lref_push" +"frees_lref_pushs" +"frees_mono" +"frees_pair" +"frees_pair_drops" +"frees_req_conf" +"frees_reqx_conf" +"frees_sex_conf" +"frees_sort" +"frees_teqx_conf" +"frees_teqx_conf_reqx" +"frees_total" +"frees_unit" +"frees_unit_drops" +"fsge_rex_trans" +"fsle" +"fsle_bind" +"fsle_bind_dx_dx" +"fsle_bind_dx_sn" +"fsle_bind_eq" +"fsle_bind_sn_ge" +"fsle_flat" +"fsle_flat_dx_dx" +"fsle_flat_dx_sn" +"fsle_flat_sn" +"fsle_frees_trans" +"fsle_frees_trans_eq" +"fsle_fwd_pair_sn" +"fsle_gref" +"fsle_gref_bi" +"fsle_inv_frees_eq" +"fsle_inv_lifts_sn" +"fsle_lifts_dx" +"fsle_lifts_sn" +"fsle_lifts_SO" +"fsle_lifts_SO_sn" +"fsle_pair_bi" +"fsle_refl" +"fsle_shift" +"fsle_sort" +"fsle_sort_bi" +"fsle_trans_dx" +"fsle_trans_rc" +"fsle_trans_sn" +"fsle_unit_bi" +"f_transitive_next" +"fw" +"fw_clear" +"fw_lpair_sn" +"fw_shift" +"fw_tpair_dx" +"fw_tpair_sn" +"GAtom" +"gcp" +"gcp2_all" +"gcr" +"gcr_aaa" +"genv" +"glength" +"GPair" +"GRef" +"gw" +"gw_pair" +"is_apear_dec" +"is_lifts_dec" +"item0" +"item2" +"LAtom" +"LBind" +"length" +"length_atom" +"length_bind" +"length_inv_succ_dx" +"length_inv_succ_dx_ltail" +"length_inv_succ_sn" +"length_inv_succ_sn_ltail" +"length_inv_zero_dx" +"length_inv_zero_sn" +"lenv" +"lenv_case_tail" +"lenv_ind_tail" +"lex" +"lex_atom" +"lex_bind" +"lex_bind_refl_dx" +"lex_co" +"lex_conf" +"lex_confluent" +"lex_CTC" +"lex_CTC_ind_dx" +"lex_CTC_ind_sn" +"lex_CTC_inj" +"lex_CTC_step_dx" +"lex_CTC_step_sn" +"lex_dropable_dx" +"lex_dropable_sn" +"lex_drops_conf_pair" +"lex_drops_trans_pair" +"lex_fwd_length" +"lex_ind" +"lex_inv_atom_dx" +"lex_inv_atom_sn" +"lex_inv_bind_dx" +"lex_inv_bind_sn" +"lex_inv_CTC" +"lex_inv_pair" +"lex_inv_pair_dx" +"lex_inv_pair_sn" +"lex_inv_unit_dx" +"lex_inv_unit_sn" +"lex_liftable_dedropable_sn" +"lex_pair" +"lex_refl" +"lex_trans" +"lex_transitive" +"lex_unit" +"liftable2_bi" +"liftable2_dx" +"liftable2_sn" +"liftable2_sn_bi" +"liftable2_sn_dx" +"lifts" +"lifts_applv" +"liftsb" +"liftsb_conf" +"liftsb_div3" +"liftsb_eq_repl_back" +"liftsb_fwd_bw" +"liftsb_fwd_isid" +"lifts_bind" +"liftsb_inj" +"liftsb_inv_pair_dx" +"liftsb_inv_pair_sn" +"liftsb_inv_unit_dx" +"liftsb_inv_unit_sn" +"liftsb_mono" +"liftsb_refl" +"liftsb_split_trans" +"liftsb_total" +"liftsb_trans" +"lifts_conf" +"lifts_div3" +"lifts_div4" +"lifts_div4_one" +"lifts_eq_repl_back" +"lifts_eq_repl_fwd" +"lifts_flat" +"lifts_fwd_isid" +"lifts_fwd_pair1" +"lifts_fwd_pair2" +"lifts_fwd_tw" +"lifts_gref" +"lifts_inj" +"lifts_inv_applv1" +"lifts_inv_applv2" +"lifts_inv_atom1" +"lifts_inv_atom2" +"lifts_inv_bind1" +"lifts_inv_bind1_aux" +"lifts_inv_bind2" +"lifts_inv_bind2_aux" +"lifts_inv_flat1" +"lifts_inv_flat1_aux" +"lifts_inv_flat2" +"lifts_inv_flat2_aux" +"lifts_inv_gref1" +"lifts_inv_gref1_aux" +"lifts_inv_gref2" +"lifts_inv_gref2_aux" +"lifts_inv_lref1" +"lifts_inv_lref1_aux" +"lifts_inv_lref1_uni" +"lifts_inv_lref2" +"lifts_inv_lref2_aux" +"lifts_inv_lref2_uni" +"lifts_inv_lref2_uni_ge" +"lifts_inv_lref2_uni_lt" +"lifts_inv_pair_xy_x" +"lifts_inv_pair_xy_y" +"lifts_inv_push_succ_sn" +"lifts_inv_push_zero_sn" +"lifts_inv_sort1" +"lifts_inv_sort1_aux" +"lifts_inv_sort2" +"lifts_inv_sort2_aux" +"lifts_lref" +"lifts_lref_ge" +"lifts_lref_ge_minus" +"lifts_lref_lt" +"lifts_lref_uni" +"lifts_mono" +"lifts_push_lref" +"lifts_push_zero" +"lifts_refl" +"lifts_simple_dx" +"lifts_simple_sn" +"lifts_sort" +"lifts_split_div" +"lifts_split_trans" +"lifts_total" +"lifts_trans" +"lifts_trans4_one" +"lifts_trans_uni" +"lifts_uni" +"liftsv" +"liftsv_cons" +"liftsv_inj" +"liftsv_inv_cons1" +"liftsv_inv_cons1_aux" +"liftsv_inv_cons2" +"liftsv_inv_cons2_aux" +"liftsv_inv_nil1" +"liftsv_inv_nil1_aux" +"liftsv_inv_nil2" +"liftsv_inv_nil2_aux" +"liftsv_mono" +"liftsv_nil" +"liftsv_split_trans" +"liftsv_total" +"liftsv_trans" +"LRef" +"lsuba" +"lsuba_aaa_conf" +"lsuba_aaa_trans" +"lsuba_atom" +"lsuba_beta" +"lsuba_bind" +"lsuba_drops_conf_isuni" +"lsuba_drops_trans_isuni" +"lsuba_fwd_lsubr" +"lsuba_inv_atom1" +"lsuba_inv_atom1_aux" +"lsuba_inv_atom2" +"lsuba_inv_atom2_aux" +"lsuba_inv_bind1" +"lsuba_inv_bind1_aux" +"lsuba_inv_bind2" +"lsuba_inv_bind2_aux" +"lsuba_lsubc" +"lsuba_refl" +"lsuba_trans" +"lsubc" +"lsubc_atom" +"lsubc_beta" +"lsubc_bind" +"lsubc_drops_trans_isuni" +"lsubc_fwd_lsubr" +"lsubc_inv_atom1" +"lsubc_inv_atom1_aux" +"lsubc_inv_atom2" +"lsubc_inv_atom2_aux" +"lsubc_inv_bind1" +"lsubc_inv_bind1_aux" +"lsubc_inv_bind2" +"lsubc_inv_bind2_aux" +"lsubc_refl" +"lsubf" +"lsubf_atom" +"lsubf_beta" +"lsubf_beta_tl_dx" +"lsubf_bind" +"lsubf_bind_tl_dx" +"lsubf_eq_repl_back1" +"lsubf_eq_repl_back2" +"lsubf_eq_repl_fwd1" +"lsubf_eq_repl_fwd2" +"lsubf_frees_trans" +"lsubf_fwd_bind_tl" +"lsubf_fwd_isid_dx" +"lsubf_fwd_isid_sn" +"lsubf_fwd_lsubr_isdiv" +"lsubf_fwd_sle" +"lsubf_inv_atom" +"lsubf_inv_atom1" +"lsubf_inv_atom1_aux" +"lsubf_inv_atom2" +"lsubf_inv_atom2_aux" +"lsubf_inv_beta_sn" +"lsubf_inv_bind_sn" +"lsubf_inv_pair1" +"lsubf_inv_pair1_aux" +"lsubf_inv_pair2" +"lsubf_inv_pair2_aux" +"lsubf_inv_push1" +"lsubf_inv_push1_aux" +"lsubf_inv_push2" +"lsubf_inv_push2_aux" +"lsubf_inv_push_sn" +"lsubf_inv_refl" +"lsubf_inv_sor_dx" +"lsubf_inv_unit1" +"lsubf_inv_unit1_aux" +"lsubf_inv_unit2" +"lsubf_inv_unit2_aux" +"lsubf_inv_unit_sn" +"lsubf_push" +"lsubf_refl" +"lsubf_refl_eq" +"lsubf_sor" +"lsubf_unit" +"lsubr" +"lsubr_atom" +"lsubr_beta" +"lsubr_bind" +"lsubr_fwd_bind1" +"lsubr_fwd_bind2" +"lsubr_fwd_drops2_abbr" +"lsubr_fwd_drops2_bind" +"lsubr_fwd_length" +"lsubr_inv_abbr2" +"lsubr_inv_abst1" +"lsubr_inv_abst2" +"lsubr_inv_atom1" +"lsubr_inv_atom1_aux" +"lsubr_inv_atom2" +"lsubr_inv_atom2_aux" +"lsubr_inv_bind1" +"lsubr_inv_bind1_aux" +"lsubr_inv_bind2" +"lsubr_inv_bind2_aux" +"lsubr_inv_pair2" +"lsubr_inv_unit1" +"lsubr_inv_unit2" +"lsubr_lsubf" +"lsubr_lsubf_isid" +"lsubr_refl" +"lsubr_trans" +"lsubr_unit" +"ltail_length" +"lveq" +"lveq_atom" +"lveq_bind" +"lveq_fwd_abst_bind_length_le" +"lveq_fwd_bind_abst_length_le" +"lveq_fwd_gen" +"lveq_fwd_length" +"lveq_fwd_length_eq" +"lveq_fwd_length_le_dx" +"lveq_fwd_length_le_sn" +"lveq_fwd_length_minus" +"lveq_fwd_length_plus" +"lveq_fwd_pair_dx" +"lveq_fwd_pair_sn" +"lveq_inj" +"lveq_inj_length" +"lveq_inj_void_dx_le" +"lveq_inj_void_sn_ge" +"lveq_inv_atom_atom" +"lveq_inv_atom_bind" +"lveq_inv_bind" +"lveq_inv_bind_atom" +"lveq_inv_bind_O" +"lveq_inv_pair_pair" +"lveq_inv_succ" +"lveq_inv_succ_aux" +"lveq_inv_succ_dx" +"lveq_inv_succ_sn" +"lveq_inv_succ_sn_aux" +"lveq_inv_void_dx_length" +"lveq_inv_void_sn_length" +"lveq_inv_void_succ_dx" +"lveq_inv_void_succ_sn" +"lveq_inv_zero" +"lveq_inv_zero_aux" +"lveq_length_eq" +"lveq_length_fwd_dx" +"lveq_length_fwd_sn" +"lveq_refl" +"lveq_sym" +"lveq_void_dx" +"lveq_void_sn" +"lw" +"lw_bind" +"mk_ac" +"mk_ac_props" +"mk_gcp" +"mk_gcr" +"mk_sd" +"mk_sd_props" +"mk_sh" +"mk_sh_acyclic" +"mk_sh_decidable" +"mk_sh_lt" +"nexts_le" +"nexts_lt" +"nf" +"R_confluent2_rex" +"req" +"req_feqx_trans" +"req_fsle_comp" +"req_fwd_rex" +"req_inv_bind" +"req_inv_flat" +"req_inv_lifts_bi" +"req_inv_lref_bind_dx" +"req_inv_lref_bind_sn" +"req_inv_zero_pair_dx" +"req_inv_zero_pair_sn" +"req_refl" +"req_reqx" +"req_reqx_trans" +"req_rex_trans" +"req_transitive" +"reqx" +"reqx_atom" +"reqx_bind" +"reqx_bind_repl_dx" +"reqx_bind_void" +"reqx_canc_dx" +"reqx_canc_sn" +"reqx_dec" +"reqx_flat" +"reqx_fqup_trans" +"reqx_fquq_trans" +"reqx_fqus_trans" +"reqx_fqu_trans" +"reqx_fsge_comp" +"reqx_fwd_bind_dx" +"reqx_fwd_bind_dx_void" +"reqx_fwd_dx" +"reqx_fwd_flat_dx" +"reqx_fwd_length" +"reqx_fwd_pair_sn" +"reqx_fwd_zero_pair" +"reqx_gref" +"reqx_gref_length" +"reqx_inv_atom_dx" +"reqx_inv_atom_sn" +"reqx_inv_bind" +"reqx_inv_bind_void" +"reqx_inv_flat" +"reqx_inv_lifts_bi" +"reqx_inv_lifts_dx" +"reqx_inv_lifts_sn" +"reqx_inv_lref" +"reqx_inv_lref_bind_dx" +"reqx_inv_lref_bind_sn" +"reqx_inv_lref_pair_bi" +"reqx_inv_lref_pair_dx" +"reqx_inv_lref_pair_sn" +"reqx_inv_zero" +"reqx_inv_zero_pair_dx" +"reqx_inv_zero_pair_sn" +"reqx_lifts_bi" +"reqx_lifts_sn" +"reqx_lref" +"reqx_pair" +"reqx_pair_refl" +"reqx_refl" +"reqx_repl" +"reqx_rneqx_trans" +"reqx_sort" +"reqx_sort_length" +"reqx_sym" +"reqx_trans" +"reqx_unit" +"reqx_unit_length" +"rex" +"rex_atom" +"rex_bind" +"rex_bind_dx_split" +"rex_bind_dx_split_void" +"rex_bind_repl_dx" +"rex_bind_void" +"rex_co" +"rex_conf" +"rex_confluent" +"rex_dec" +"rex_dropable_dx" +"rex_dropable_sn" +"rex_flat" +"rex_flat_dx_split" +"rex_fsge_compatible" +"rex_fsle_compatible" +"rex_fwd_bind_dx" +"rex_fwd_bind_dx_void" +"rex_fwd_dx" +"rex_fwd_flat_dx" +"rex_fwd_length" +"rex_fwd_pair_sn" +"rex_fwd_zero_pair" +"rex_gref" +"rex_gref_length" +"rex_inv_atom_dx" +"rex_inv_atom_sn" +"rex_inv_bind" +"rex_inv_bind_void" +"rex_inv_flat" +"rex_inv_frees" +"rex_inv_gref" +"rex_inv_gref_bind_dx" +"rex_inv_gref_bind_sn" +"rex_inv_lex_req" +"rex_inv_lifts_bi" +"rex_inv_lref" +"rex_inv_lref_bind_dx" +"rex_inv_lref_bind_sn" +"rex_inv_lref_pair_bi" +"rex_inv_lref_pair_dx" +"rex_inv_lref_pair_sn" +"rex_inv_lref_unit_dx" +"rex_inv_lref_unit_sn" +"rex_inv_sort" +"rex_inv_sort_bind_dx" +"rex_inv_sort_bind_sn" +"rex_inv_zero" +"rex_inv_zero_length" +"rex_inv_zero_pair_dx" +"rex_inv_zero_pair_sn" +"rex_inv_zero_unit_dx" +"rex_inv_zero_unit_sn" +"rex_isid" +"rex_lex" +"rex_liftable_dedropable_sn" +"rex_lifts_bi" +"rex_lref" +"rex_pair" +"rex_pair_refl" +"rex_pair_sn_split" +"rex_refl" +"rexs" +"rexs_atom" +"rexs_co" +"rexs_fwd_bind_dx" +"rexs_fwd_bind_dx_void" +"rexs_fwd_flat_dx" +"rexs_fwd_length" +"rexs_fwd_pair_sn" +"rexs_gref" +"rexs_ind_dx" +"rexs_ind_sn" +"rexs_inv_atom_dx" +"rexs_inv_atom_sn" +"rexs_inv_bind" +"rexs_inv_bind_void" +"rexs_inv_flat" +"rexs_inv_gref" +"rexs_inv_gref_bind_dx" +"rexs_inv_gref_bind_sn" +"rexs_inv_lex_req" +"rexs_inv_sort" +"rexs_inv_sort_bind_dx" +"rexs_inv_sort_bind_sn" +"rexs_lex" +"rexs_lex_req" +"rexs_lref" +"rex_sort" +"rex_sort_length" +"rexs_pair" +"rexs_pair_refl" +"rexs_refl" +"rexs_sort" +"rexs_step_dx" +"rexs_step_sn" +"rexs_sym" +"rexs_tc" +"rexs_trans" +"rexs_unit" +"rex_sym" +"rex_trans_fsle" +"rex_transitive" +"rex_trans_next" +"rex_unit" +"rex_unit_length" +"rex_unit_sn" +"R_fsge_compatible" +"rfw" +"rfw_clear" +"rfw_lpair_dx" +"rfw_lpair_sn" +"rfw_shift" +"rfw_tpair_dx" +"rfw_tpair_sn" +"rneqx_inv_bind" +"rneqx_inv_bind_void" +"rneqx_inv_flat" +"rneqx_reqx_canc_dx" +"rneqx_reqx_div" +"rnex_inv_bind" +"rnex_inv_bind_void" +"rnex_inv_flat" +"R_pw_confluent2_sex" +"S1" +"S2" +"S3" +"S5" +"S6" +"S7" +"sd" +"sd_d" +"sd_d_correct" +"sd_d_props" +"sd_d_SS" +"sd_O" +"sd_O_props" +"sd_props" +"sd_SO" +"sd_SO_props" +"seq" +"seq_canc_dx" +"seq_canc_sn" +"seq_co_dedropable_sn" +"seq_co_dropable_dx" +"seq_co_dropable_sn" +"seq_drops_conf_next" +"seq_drops_trans_next" +"seq_eq_repl_back" +"seq_eq_repl_fwd" +"seq_fwd_length" +"seq_inv_atom1" +"seq_inv_atom2" +"seq_inv_next" +"seq_inv_next1" +"seq_inv_next2" +"seq_inv_push" +"seq_inv_push1" +"seq_inv_push2" +"seq_inv_tl" +"seq_join" +"seq_meet" +"seq_refl" +"seq_sym" +"seq_trans" +"sex" +"sex_atom" +"sex_canc_dx" +"sex_canc_sn" +"sex_co" +"sex_co_dropable_dx" +"sex_co_dropable_sn" +"sex_co_isid" +"sex_conf" +"sex_dec" +"sex_dropable_dx_aux" +"sex_drops_conf_next" +"sex_drops_conf_push" +"sex_drops_trans_next" +"sex_drops_trans_push" +"sex_eq_repl_back" +"sex_eq_repl_fwd" +"sex_fwd_bind" +"sex_fwd_length" +"sex_inv_atom1" +"sex_inv_atom1_aux" +"sex_inv_atom2" +"sex_inv_atom2_aux" +"sex_inv_next" +"sex_inv_next1" +"sex_inv_next1_aux" +"sex_inv_next2" +"sex_inv_next2_aux" +"sex_inv_push" +"sex_inv_push1" +"sex_inv_push1_aux" +"sex_inv_push2" +"sex_inv_push2_aux" +"sex_inv_tc_dx" +"sex_inv_tc_sn" +"sex_inv_tl" +"sex_join" +"sex_length_cfull" +"sex_length_isid" +"sex_liftable_co_dedropable_bi" +"sex_liftable_co_dedropable_sn" +"sex_meet" +"sex_next" +"sex_pair_repl" +"sex_push" +"sex_refl" +"sex_sdj" +"sex_sdj_split" +"sex_sle_split" +"sex_sym" +"sex_tc_dx" +"sex_tc_inj_dx" +"sex_tc_inj_sn" +"sex_tc_next" +"sex_tc_next_dx" +"sex_tc_next_sn" +"sex_tc_push" +"sex_tc_push_dx" +"sex_tc_push_sn" +"sex_tc_refl" +"sex_tc_step_dx" +"sex_trans" +"sex_trans_gen" +"sex_trans_id_cfull" +"sex_transitive" +"sh" +"sh_acyclic" +"sh_decidable" +"sh_lt" +"sh_lt_acyclic" +"sh_lt_dec" +"sh_lt_nexts_inv_lt" +"simple" +"simple_atom" +"simple_dec_ex" +"simple_flat" +"simple_inv_bind" +"simple_inv_bind_aux" +"simple_inv_pair" +"simple_teqo_repl_dx" +"simple_teqo_repl_sn" +"sle_seq_trans" +"sle_sex_conf" +"sle_sex_trans" +"Sort" +"s_rs_transitive_isid" +"s_rs_transitive_lex_inv_isid" +"TAtom" +"tc_f_dedropable_sn" +"tc_f_dropable_dx" +"tc_f_dropable_sn" +"teqo" +"teqo_canc_dx" +"teqo_canc_sn" +"teqo_dec" +"teqo_gref" +"teqo_inv_applv_bind_simple" +"teqo_inv_gref1" +"teqo_inv_gref1_aux" +"teqo_inv_lifts_bi" +"teqo_inv_lref1" +"teqo_inv_lref1_aux" +"teqo_inv_pair" +"teqo_inv_pair1" +"teqo_inv_pair1_aux" +"teqo_inv_pair2" +"teqo_inv_pair2_aux" +"teqo_inv_sort1" +"teqo_inv_sort1_aux" +"teqo_lifts_bi" +"teqo_lifts_dx" +"teqo_lifts_sn" +"teqo_lref" +"teqo_pair" +"teqo_refl" +"teqo_sort" +"teqo_sym" +"teqo_trans" +"teqx" +"teqx_canc_dx" +"teqx_canc_sn" +"teqx_dec" +"teqx_ext" +"teqx_feqx" +"teqx_fqup_trans" +"teqx_fquq_trans" +"teqx_fqus_trans" +"teqx_fqu_trans" +"teqx_fwd_atom1" +"teqx_gref" +"teqx_inv_gref1" +"teqx_inv_gref1_aux" +"teqx_inv_lifts_bi" +"teqx_inv_lifts_dx" +"teqx_inv_lifts_sn" +"teqx_inv_lref1" +"teqx_inv_lref1_aux" +"teqx_inv_pair" +"teqx_inv_pair1" +"teqx_inv_pair1_aux" +"teqx_inv_pair2" +"teqx_inv_pair_xy_x" +"teqx_inv_pair_xy_y" +"teqx_inv_sort1" +"teqx_inv_sort1_aux" +"teqx_inv_sort2" +"teqx_lifts_bi" +"teqx_lifts_dx" +"teqx_lifts_inv_pair_sn" +"teqx_lifts_sn" +"teqx_lref" +"teqx_pair" +"teqx_refl" +"teqx_repl" +"teqx_reqx_conf" +"teqx_reqx_div" +"teqx_rex_conf" +"teqx_rex_div" +"teqx_sort" +"teqx_sym" +"teqx_teqo" +"teqx_tneqx_trans" +"teqx_trans" +"teqx_tweq" +"term" +"tneqx_inv_pair" +"tneqx_teqx_canc_dx" +"TPair" +"tw" +"tweq" +"tweq_abbr" +"tweq_abbr_neg" +"tweq_abbr_pos" +"tweq_abst" +"tweq_appl" +"tweq_canc_dx" +"tweq_canc_sn" +"tweq_cast" +"tweq_dec" +"tweq_fwd_pair_bi" +"tweq_fwd_pair_sn" +"tweq_gref" +"tweq_inv_abbr_neg_sn" +"tweq_inv_abbr_pos_bi" +"tweq_inv_abbr_pos_sn" +"tweq_inv_abbr_pos_x_lifts_y_y" +"tweq_inv_abbr_sn" +"tweq_inv_abbr_sn_aux" +"tweq_inv_abst_sn" +"tweq_inv_abst_sn_aux" +"tweq_inv_appl_bi" +"tweq_inv_appl_sn" +"tweq_inv_appl_sn_aux" +"tweq_inv_cast_bi" +"tweq_inv_cast_sn" +"tweq_inv_cast_sn_aux" +"tweq_inv_cast_xy_y" +"tweq_inv_gref_sn" +"tweq_inv_gref_sn_aux" +"tweq_inv_lifts_bi" +"tweq_inv_lref_sn" +"tweq_inv_lref_sn_aux" +"tweq_inv_sort_sn" +"tweq_inv_sort_sn_aux" +"tweq_lifts_bi" +"tweq_lifts_dx" +"tweq_lifts_sn" +"tweq_lref" +"tweq_refl" +"tweq_repl" +"tweq_simple_trans" +"tweq_sort" +"tweq_sym" +"tweq_trans" +"tw_le_pair_dx" +"tw_pos" +"Void"