(* *)
(**************************************************************************)
-include "ground_2/xoa/ex_3_5.ma".
-include "ground_2/xoa/ex_5_7.ma".
+include "ground/xoa/ex_3_5.ma".
+include "ground/xoa/ex_5_7.ma".
include "basic_2/rt_transition/cpm_lsubr.ma".
include "basic_2/rt_computation/cpms_drops.ma".
include "basic_2/rt_computation/cprs.ma".
(* Basic_2A1: includes: cprs_bind *)
theorem cpms_bind (h) (n) (G) (L):
- â\88\80I,V1,T1,T2. â\9dªG,L.â\93\91[I]V1â\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80V2. â\9dªG,Lâ\9d« ⊢ V1 ➡*[h,0] V2 →
- â\88\80p. â\9dªG,Lâ\9d« ⊢ ⓑ[p,I]V1.T1 ➡*[h,n] ⓑ[p,I]V2.T2.
+ â\88\80I,V1,T1,T2. â\9d¨G,L.â\93\91[I]V1â\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80V2. â\9d¨G,Lâ\9d© ⊢ V1 ➡*[h,0] V2 →
+ â\88\80p. â\9d¨G,Lâ\9d© ⊢ ⓑ[p,I]V1.T1 ➡*[h,n] ⓑ[p,I]V2.T2.
#h #n #G #L #I #V1 #T1 #T2 #HT12 #V2 #H @(cprs_ind_dx … H) -V2
[ /2 width=1 by cpms_bind_dx/
| #V #V2 #_ #HV2 #IH #p >(plus_n_O … n) -HT12
qed.
theorem cpms_appl (h) (n) (G) (L):
- â\88\80T1,T2. â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80V1,V2. â\9dªG,Lâ\9d« ⊢ V1 ➡*[h,0] V2 →
- â\9dªG,Lâ\9d« ⊢ ⓐV1.T1 ➡*[h,n] ⓐV2.T2.
+ â\88\80T1,T2. â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80V1,V2. â\9d¨G,Lâ\9d© ⊢ V1 ➡*[h,0] V2 →
+ â\9d¨G,Lâ\9d© ⊢ ⓐV1.T1 ➡*[h,n] ⓐV2.T2.
#h #n #G #L #T1 #T2 #HT12 #V1 #V2 #H @(cprs_ind_dx … H) -V2
[ /2 width=1 by cpms_appl_dx/
| #V #V2 #_ #HV2 #IH >(plus_n_O … n) -HT12
(* Basic_2A1: includes: cprs_beta_rc *)
theorem cpms_beta_rc (h) (n) (G) (L):
- â\88\80V1,V2. â\9dªG,Lâ\9d« ⊢ V1 ➡[h,0] V2 →
- â\88\80W1,T1,T2. â\9dªG,L.â\93\9bW1â\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80W2. â\9dªG,Lâ\9d« ⊢ W1 ➡*[h,0] W2 →
- â\88\80p. â\9dªG,Lâ\9d« ⊢ ⓐV1.ⓛ[p]W1.T1 ➡*[h,n] ⓓ[p]ⓝW2.V2.T2.
+ â\88\80V1,V2. â\9d¨G,Lâ\9d© ⊢ V1 ➡[h,0] V2 →
+ â\88\80W1,T1,T2. â\9d¨G,L.â\93\9bW1â\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80W2. â\9d¨G,Lâ\9d© ⊢ W1 ➡*[h,0] W2 →
+ â\88\80p. â\9d¨G,Lâ\9d© ⊢ ⓐV1.ⓛ[p]W1.T1 ➡*[h,n] ⓓ[p]ⓝW2.V2.T2.
#h #n #G #L #V1 #V2 #HV12 #W1 #T1 #T2 #HT12 #W2 #H @(cprs_ind_dx … H) -W2
[ /2 width=1 by cpms_beta_dx/
| #W #W2 #_ #HW2 #IH #p >(plus_n_O … n) -HT12
(* Basic_2A1: includes: cprs_beta *)
theorem cpms_beta (h) (n) (G) (L):
- â\88\80W1,T1,T2. â\9dªG,L.â\93\9bW1â\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80W2. â\9dªG,Lâ\9d« ⊢ W1 ➡*[h,0] W2 →
- â\88\80V1,V2. â\9dªG,Lâ\9d« ⊢ V1 ➡*[h,0] V2 →
- â\88\80p. â\9dªG,Lâ\9d« ⊢ ⓐV1.ⓛ[p]W1.T1 ➡*[h,n] ⓓ[p]ⓝW2.V2.T2.
+ â\88\80W1,T1,T2. â\9d¨G,L.â\93\9bW1â\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80W2. â\9d¨G,Lâ\9d© ⊢ W1 ➡*[h,0] W2 →
+ â\88\80V1,V2. â\9d¨G,Lâ\9d© ⊢ V1 ➡*[h,0] V2 →
+ â\88\80p. â\9d¨G,Lâ\9d© ⊢ ⓐV1.ⓛ[p]W1.T1 ➡*[h,n] ⓓ[p]ⓝW2.V2.T2.
#h #n #G #L #W1 #T1 #T2 #HT12 #W2 #HW12 #V1 #V2 #H @(cprs_ind_dx … H) -V2
[ /2 width=1 by cpms_beta_rc/
| #V #V2 #_ #HV2 #IH #p >(plus_n_O … n) -HT12
(* Basic_2A1: includes: cprs_theta_rc *)
theorem cpms_theta_rc (h) (n) (G) (L):
- â\88\80V1,V. â\9dªG,Lâ\9d« ⊢ V1 ➡[h,0] V → ∀V2. ⇧[1] V ≘ V2 →
- â\88\80W1,T1,T2. â\9dªG,L.â\93\93W1â\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80W2. â\9dªG,Lâ\9d« ⊢ W1 ➡*[h,0] W2 →
- â\88\80p. â\9dªG,Lâ\9d« ⊢ ⓐV1.ⓓ[p]W1.T1 ➡*[h,n] ⓓ[p]W2.ⓐV2.T2.
+ â\88\80V1,V. â\9d¨G,Lâ\9d© ⊢ V1 ➡[h,0] V → ∀V2. ⇧[1] V ≘ V2 →
+ â\88\80W1,T1,T2. â\9d¨G,L.â\93\93W1â\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80W2. â\9d¨G,Lâ\9d© ⊢ W1 ➡*[h,0] W2 →
+ â\88\80p. â\9d¨G,Lâ\9d© ⊢ ⓐV1.ⓓ[p]W1.T1 ➡*[h,n] ⓓ[p]W2.ⓐV2.T2.
#h #n #G #L #V1 #V #HV1 #V2 #HV2 #W1 #T1 #T2 #HT12 #W2 #H @(cprs_ind_dx … H) -W2
[ /2 width=3 by cpms_theta_dx/
| #W #W2 #_ #HW2 #IH #p >(plus_n_O … n) -HT12
(* Basic_2A1: includes: cprs_theta *)
theorem cpms_theta (h) (n) (G) (L):
- â\88\80V,V2. â\87§[1] V â\89\98 V2 â\86\92 â\88\80W1,W2. â\9dªG,Lâ\9d« ⊢ W1 ➡*[h,0] W2 →
- â\88\80T1,T2. â\9dªG,L.â\93\93W1â\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80V1. â\9dªG,Lâ\9d« ⊢ V1 ➡*[h,0] V →
- â\88\80p. â\9dªG,Lâ\9d« ⊢ ⓐV1.ⓓ[p]W1.T1 ➡*[h,n] ⓓ[p]W2.ⓐV2.T2.
+ â\88\80V,V2. â\87§[1] V â\89\98 V2 â\86\92 â\88\80W1,W2. â\9d¨G,Lâ\9d© ⊢ W1 ➡*[h,0] W2 →
+ â\88\80T1,T2. â\9d¨G,L.â\93\93W1â\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80V1. â\9d¨G,Lâ\9d© ⊢ V1 ➡*[h,0] V →
+ â\88\80p. â\9d¨G,Lâ\9d© ⊢ ⓐV1.ⓓ[p]W1.T1 ➡*[h,n] ⓓ[p]W2.ⓐV2.T2.
#h #n #G #L #V #V2 #HV2 #W1 #W2 #HW12 #T1 #T2 #HT12 #V1 #H @(cprs_ind_sn … H) -V1
[ /2 width=3 by cpms_theta_rc/
| #V1 #V0 #HV10 #_ #IH #p >(plus_O_n … n) -HT12
(* Basic_2A1: uses: lstas_scpds_trans scpds_strap2 *)
theorem cpms_trans (h) (G) (L):
- â\88\80n1,T1,T. â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n1] T →
- â\88\80n2,T2. â\9dªG,Lâ\9d« â\8a¢ T â\9e¡*[h,n2] T2 â\86\92 â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n1+n2] T2.
+ â\88\80n1,T1,T. â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n1] T →
+ â\88\80n2,T2. â\9d¨G,Lâ\9d© â\8a¢ T â\9e¡*[h,n2] T2 â\86\92 â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n1+n2] T2.
/2 width=3 by ltc_trans/ qed-.
(* Basic_2A1: uses: scpds_cprs_trans *)
theorem cpms_cprs_trans (h) (n) (G) (L):
- â\88\80T1,T. â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n] T →
- â\88\80T2. â\9dªG,Lâ\9d« â\8a¢ T â\9e¡*[h,0] T2 â\86\92 â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n] T2.
+ â\88\80T1,T. â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n] T →
+ â\88\80T2. â\9d¨G,Lâ\9d© â\8a¢ T â\9e¡*[h,0] T2 â\86\92 â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n] T2.
#h #n #G #L #T1 #T #HT1 #T2 #HT2 >(plus_n_O … n)
/2 width=3 by cpms_trans/ qed-.
(* Advanced inversion lemmas ************************************************)
lemma cpms_inv_appl_sn (h) (n) (G) (L):
- â\88\80V1,T1,X2. â\9dªG,Lâ\9d« ⊢ ⓐV1.T1 ➡*[h,n] X2 →
- â\88¨â\88¨ â\88\83â\88\83V2,T2. â\9dªG,Lâ\9d« â\8a¢ V1 â\9e¡*[h,0] V2 & â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n] T2 & X2 = ⓐV2.T2
- | â\88\83â\88\83n1,n2,p,W,T. â\9dªG,Lâ\9d« â\8a¢ T1 â\9e¡*[h,n1] â\93\9b[p]W.T & â\9dªG,Lâ\9d« ⊢ ⓓ[p]ⓝW.V1.T ➡*[h,n2] X2 & n1 + n2 = n
- | â\88\83â\88\83n1,n2,p,V0,V2,V,T. â\9dªG,Lâ\9d« â\8a¢ V1 â\9e¡*[h,0] V0 & â\87§[1] V0 â\89\98 V2 & â\9dªG,Lâ\9d« â\8a¢ T1 â\9e¡*[h,n1] â\93\93[p]V.T & â\9dªG,Lâ\9d« ⊢ ⓓ[p]V.ⓐV2.T ➡*[h,n2] X2 & n1 + n2 = n.
+ â\88\80V1,T1,X2. â\9d¨G,Lâ\9d© ⊢ ⓐV1.T1 ➡*[h,n] X2 →
+ â\88¨â\88¨ â\88\83â\88\83V2,T2. â\9d¨G,Lâ\9d© â\8a¢ V1 â\9e¡*[h,0] V2 & â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n] T2 & X2 = ⓐV2.T2
+ | â\88\83â\88\83n1,n2,p,W,T. â\9d¨G,Lâ\9d© â\8a¢ T1 â\9e¡*[h,n1] â\93\9b[p]W.T & â\9d¨G,Lâ\9d© ⊢ ⓓ[p]ⓝW.V1.T ➡*[h,n2] X2 & n1 + n2 = n
+ | â\88\83â\88\83n1,n2,p,V0,V2,V,T. â\9d¨G,Lâ\9d© â\8a¢ V1 â\9e¡*[h,0] V0 & â\87§[1] V0 â\89\98 V2 & â\9d¨G,Lâ\9d© â\8a¢ T1 â\9e¡*[h,n1] â\93\93[p]V.T & â\9d¨G,Lâ\9d© ⊢ ⓓ[p]V.ⓐV2.T ➡*[h,n2] X2 & n1 + n2 = n.
#h #n #G #L #V1 #T1 #U2 #H
@(cpms_ind_dx … H) -U2 /3 width=5 by or3_intro0, ex3_2_intro/
#n1 #n2 #U #U2 #_ * *
qed-.
lemma cpms_inv_plus (h) (G) (L):
- â\88\80n1,n2,T1,T2. â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n1+n2] T2 →
- â\88\83â\88\83T. â\9dªG,Lâ\9d« â\8a¢ T1 â\9e¡*[h,n1] T & â\9dªG,Lâ\9d« ⊢ T ➡*[h,n2] T2.
+ â\88\80n1,n2,T1,T2. â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n1+n2] T2 →
+ â\88\83â\88\83T. â\9d¨G,Lâ\9d© â\8a¢ T1 â\9e¡*[h,n1] T & â\9d¨G,Lâ\9d© ⊢ T ➡*[h,n2] T2.
#h #G #L #n1 elim n1 -n1 /2 width=3 by ex2_intro/
#n1 #IH #n2 #T1 #T2 <plus_S1 #H
elim (cpms_inv_succ_sn … H) -H #T0 #HT10 #HT02
(* Advanced main properties *************************************************)
theorem cpms_cast (h) (n) (G) (L):
- â\88\80T1,T2. â\9dªG,Lâ\9d« ⊢ T1 ➡*[h,n] T2 →
- â\88\80U1,U2. â\9dªG,Lâ\9d« ⊢ U1 ➡*[h,n] U2 →
- â\9dªG,Lâ\9d« ⊢ ⓝU1.T1 ➡*[h,n] ⓝU2.T2.
+ â\88\80T1,T2. â\9d¨G,Lâ\9d© ⊢ T1 ➡*[h,n] T2 →
+ â\88\80U1,U2. â\9d¨G,Lâ\9d© ⊢ U1 ➡*[h,n] U2 →
+ â\9d¨G,Lâ\9d© ⊢ ⓝU1.T1 ➡*[h,n] ⓝU2.T2.
#h #n #G #L #T1 #T2 #H @(cpms_ind_sn … H) -T1 -n
[ /3 width=3 by cpms_cast_sn/
| #n1 #n2 #T1 #T #HT1 #_ #IH #U1 #U2 #H
qed.
theorem cpms_trans_swap (h) (G) (L) (T1):
- â\88\80n1,T. â\9dªG,Lâ\9d« â\8a¢ T1 â\9e¡*[h,n1] T â\86\92 â\88\80n2,T2. â\9dªG,Lâ\9d« ⊢ T ➡*[h,n2] T2 →
- â\88\83â\88\83T0. â\9dªG,Lâ\9d« â\8a¢ T1 â\9e¡*[h,n2] T0 & â\9dªG,Lâ\9d« ⊢ T0 ➡*[h,n1] T2.
+ â\88\80n1,T. â\9d¨G,Lâ\9d© â\8a¢ T1 â\9e¡*[h,n1] T â\86\92 â\88\80n2,T2. â\9d¨G,Lâ\9d© ⊢ T ➡*[h,n2] T2 →
+ â\88\83â\88\83T0. â\9d¨G,Lâ\9d© â\8a¢ T1 â\9e¡*[h,n2] T0 & â\9d¨G,Lâ\9d© ⊢ T0 ➡*[h,n1] T2.
#h #G #L #T1 #n1 #T #HT1 #n2 #T2 #HT2
lapply (cpms_trans … HT1 … HT2) -T <commutative_plus #HT12
/2 width=1 by cpms_inv_plus/