#f1 #f2 @eq_repl_sym /2 width=3 by sor_eq_repl_back3/
qed-.
-corec lemma sor_refl: ∀f. f ⋓ f ≡ f.
+corec lemma sor_idem: ∀f. f ⋓ f ≡ f.
#f cases (pn_split f) * #g #H
[ @(sor_pp … H H H) | @(sor_nn … H H H) ] -H //
qed.
-corec lemma sor_sym: ∀f1,f2,f. f1 ⋓ f2 ≡ f → f2 ⋓ f1 ≡ f.
+corec lemma sor_comm: ∀f1,f2,f. f1 ⋓ f2 ≡ f → f2 ⋓ f1 ≡ f.
#f1 #f2 #f * -f1 -f2 -f
#f1 #f2 #f #g1 #g2 #g #Hf * * * -g1 -g2 -g
[ @sor_pp | @sor_pn | @sor_np | @sor_nn ] /2 width=7 by/
qed-.
-(* Properies on test for identity *******************************************)
+(* Properties with tail *****************************************************)
+
+lemma sor_tl: ∀f1,f2,f. f1 ⋓ f2 ≡ f → ⫱f1 ⋓ ⫱f2 ≡ ⫱f.
+#f1 cases (pn_split f1) * #g1 #H1
+#f2 cases (pn_split f2) * #g2 #H2
+#f #Hf
+[ cases (sor_inv_ppx … Hf … H1 H2)
+| cases (sor_inv_pnx … Hf … H1 H2)
+| cases (sor_inv_npx … Hf … H1 H2)
+| cases (sor_inv_nnx … Hf … H1 H2)
+] -Hf #g #Hg #H destruct //
+qed.
+
+lemma sor_xxn_tl: ∀g1,g2,g. g1 ⋓ g2 ≡ g → ∀f. ⫯f = g →
+ (∃∃f1,f2. f1 ⋓ f2 ≡ f & ⫯f1 = g1 & ⫱g2 = f2) ∨
+ (∃∃f1,f2. f1 ⋓ f2 ≡ f & ⫱g1 = f1 & ⫯f2 = g2).
+#g1 #g2 #g #H #f #H0 elim (sor_inv_xxn … H … H0) -H -H0 *
+/3 width=5 by ex3_2_intro, or_introl, or_intror/
+qed-.
+
+lemma sor_xnx_tl: ∀g1,g2,g. g1 ⋓ g2 ≡ g → ∀f2. ⫯f2 = g2 →
+ ∃∃f1,f. f1 ⋓ f2 ≡ f & ⫱g1 = f1 & ⫯f = g.
+#g1 elim (pn_split g1) * #f1 #H1 #g2 #g #H #f2 #H2
+[ elim (sor_inv_pnx … H … H1 H2) | elim (sor_inv_nnx … H … H1 H2) ] -g2
+/3 width=5 by ex3_2_intro/
+qed-.
+
+lemma sor_nxx_tl: ∀g1,g2,g. g1 ⋓ g2 ≡ g → ∀f1. ⫯f1 = g1 →
+ ∃∃f2,f. f1 ⋓ f2 ≡ f & ⫱g2 = f2 & ⫯f = g.
+#g1 #g2 elim (pn_split g2) * #f2 #H2 #g #H #f1 #H1
+[ elim (sor_inv_npx … H … H1 H2) | elim (sor_inv_nnx … H … H1 H2) ] -g1
+/3 width=5 by ex3_2_intro/
+qed-.
+
+(* Properties with iterated tail ********************************************)
+
+lemma sor_tls: ∀f1,f2,f. f1 ⋓ f2 ≡ f →
+ ∀n. ⫱*[n]f1 ⋓ ⫱*[n]f2 ≡ ⫱*[n]f.
+#f1 #f2 #f #Hf #n elim n -n /2 width=1 by sor_tl/
+qed.
+
+(* Properies with test for identity *****************************************)
corec lemma sor_isid_sn: ∀f1. 𝐈⦃f1⦄ → ∀f2. f1 ⋓ f2 ≡ f2.
#f1 * -f1
/3 width=7 by sor_pp, sor_np/
qed.
-(* Inversion lemmas on test for identity ************************************)
+lemma sor_isid: ∀f1,f2,f. 𝐈⦃f1⦄ → 𝐈⦃f2⦄ → 𝐈⦃f⦄ → f1 ⋓ f2 ≡ f.
+/4 width=3 by sor_eq_repl_back2, sor_eq_repl_back1, isid_inv_eq_repl/ qed.
+
+(* Inversion lemmas with tail ***********************************************)
+
+lemma sor_inv_tl_sn: ∀f1,f2,f. ⫱f1 ⋓ f2 ≡ f → f1 ⋓ ⫯f2 ≡ ⫯f.
+#f1 #f2 #f elim (pn_split f1) *
+#g1 #H destruct /2 width=7 by sor_pn, sor_nn/
+qed-.
+
+lemma sor_inv_tl_dx: ∀f1,f2,f. f1 ⋓ ⫱f2 ≡ f → ⫯f1 ⋓ f2 ≡ ⫯f.
+#f1 #f2 #f elim (pn_split f2) *
+#g2 #H destruct /2 width=7 by sor_np, sor_nn/
+qed-.
+
+(* Inversion lemmas with test for identity **********************************)
lemma sor_isid_inv_sn: ∀f1,f2,f. f1 ⋓ f2 ≡ f → 𝐈⦃f1⦄ → f2 ≗ f.
/3 width=4 by sor_isid_sn, sor_mono/
lemma sor_inv_isid3: ∀f1,f2,f. f1 ⋓ f2 ≡ f → 𝐈⦃f⦄ → 𝐈⦃f1⦄ ∧ 𝐈⦃f2⦄.
/3 width=4 by sor_fwd_isid2, sor_fwd_isid1, conj/ qed-.
-(* Properties on finite colength assignment *********************************)
+(* Properties with finite colength assignment *******************************)
lemma sor_fcla_ex: ∀f1,n1. 𝐂⦃f1⦄ ≡ n1 → ∀f2,n2. 𝐂⦃f2⦄ ≡ n2 →
∃∃f,n. f1 ⋓ f2 ≡ f & 𝐂⦃f⦄ ≡ n & (n1 ∨ n2) ≤ n & n ≤ n1 + n2.
#f1 #n1 #Hf1 elim Hf1 -f1 -n1 /3 width=6 by sor_isid_sn, ex4_2_intro/
#f1 #n1 #Hf1 #IH #f2 #n2 * -f2 -n2 /3 width=6 by fcla_push, fcla_next, ex4_2_intro, sor_isid_dx/
-#f2 #n2 #Hf2 elim (IH … Hf2) -IH -Hf2 -Hf1
-[ /3 width=7 by fcla_push, sor_pp, ex4_2_intro/
-| /3 width=7 by fcla_next, sor_pn, max_S2_le_S, le_S_S, ex4_2_intro/
-| /3 width=7 by fcla_next, sor_np, max_S1_le_S, le_S_S, ex4_2_intro/
+#f2 #n2 #Hf2 elim (IH … Hf2) -IH -Hf2 -Hf1 [2,4: #f #n <plus_n_Sm ] (**) (* full auto fails *)
+[ /3 width=7 by fcla_next, sor_pn, max_S2_le_S, le_S_S, ex4_2_intro/
| /4 width=7 by fcla_next, sor_nn, le_S, le_S_S, ex4_2_intro/
+| /3 width=7 by fcla_push, sor_pp, ex4_2_intro/
+| /3 width=7 by fcla_next, sor_np, max_S1_le_S, le_S_S, ex4_2_intro/
]
qed-.
/4 width=6 by sor_mono, fcla_eq_repl_back, ex3_intro/
qed-.
-(* Properties on test for finite colength ***********************************)
+(* Forward lemmas with finite colength **************************************)
+
+lemma sor_fwd_fcla_sn_ex: ∀f,n. 𝐂⦃f⦄ ≡ n → ∀f1,f2. f1 ⋓ f2 ≡ f →
+ ∃∃n1. 𝐂⦃f1⦄ ≡ n1 & n1 ≤ n.
+#f #n #H elim H -f -n
+[ /4 width=4 by sor_fwd_isid1, fcla_isid, ex2_intro/
+| #f #n #_ #IH #f1 #f2 #H
+ elim (sor_inv_xxp … H) -H [ |*: // ] #g1 #g2 #Hf #H1 #H2 destruct
+ elim (IH … Hf) -f /3 width=3 by fcla_push, ex2_intro/
+| #f #n #_ #IH #f1 #f2 #H
+ elim (sor_inv_xxn … H) -H [1,3,4: * |*: // ] #g1 #g2 #Hf #H1 #H2 destruct
+ elim (IH … Hf) -f /3 width=3 by fcla_push, fcla_next, le_S_S, le_S, ex2_intro/
+]
+qed-.
+
+lemma sor_fwd_fcla_dx_ex: ∀f,n. 𝐂⦃f⦄ ≡ n → ∀f1,f2. f1 ⋓ f2 ≡ f →
+ ∃∃n2. 𝐂⦃f2⦄ ≡ n2 & n2 ≤ n.
+/3 width=4 by sor_fwd_fcla_sn_ex, sor_comm/ qed-.
+
+(* Properties with test for finite colength *********************************)
lemma sor_isfin_ex: ∀f1,f2. 𝐅⦃f1⦄ → 𝐅⦃f2⦄ → ∃∃f. f1 ⋓ f2 ≡ f & 𝐅⦃f⦄.
#f1 #f2 * #n1 #H1 * #n2 #H2 elim (sor_fcla_ex … H1 … H2) -H1 -H2
/3 width=6 by sor_mono, isfin_eq_repl_back/
qed-.
-(* Inversion lemmas on inclusion ********************************************)
+(* Forward lemmas with test for finite colength *****************************)
+
+lemma sor_fwd_isfin_sn: ∀f. 𝐅⦃f⦄ → ∀f1,f2. f1 ⋓ f2 ≡ f → 𝐅⦃f1⦄.
+#f * #n #Hf #f1 #f2 #H
+elim (sor_fwd_fcla_sn_ex … Hf … H) -f -f2 /2 width=2 by ex_intro/
+qed-.
+
+lemma sor_fwd_isfin_dx: ∀f. 𝐅⦃f⦄ → ∀f1,f2. f1 ⋓ f2 ≡ f → 𝐅⦃f2⦄.
+#f * #n #Hf #f1 #f2 #H
+elim (sor_fwd_fcla_dx_ex … Hf … H) -f -f1 /2 width=2 by ex_intro/
+qed-.
+
+(* Inversion lemmas with test for finite colength ***************************)
+
+lemma sor_inv_isfin3: ∀f1,f2,f. f1 ⋓ f2 ≡ f → 𝐅⦃f⦄ → 𝐅⦃f1⦄ ∧ 𝐅⦃f2⦄.
+/3 width=4 by sor_fwd_isfin_dx, sor_fwd_isfin_sn, conj/ qed-.
+
+(* Inversion lemmas with inclusion ******************************************)
corec lemma sor_inv_sle_sn: ∀f1,f2,f. f1 ⋓ f2 ≡ f → f1 ⊆ f.
#f1 #f2 #f * -f1 -f2 -f
#f1 #f2 #f #g1 #g2 #g #Hf #H1 #H2 #H0
/3 width=5 by sle_push, sle_next, sle_weak/
qed-.
+
+lemma sor_inv_sle_sn_trans: ∀f1,f2,f. f1 ⋓ f2 ≡ f → ∀g. g ⊆ f1 → g ⊆ f.
+/3 width=4 by sor_inv_sle_sn, sle_trans/ qed-.
+
+lemma sor_inv_sle_dx_trans: ∀f1,f2,f. f1 ⋓ f2 ≡ f → ∀g. g ⊆ f2 → g ⊆ f.
+/3 width=4 by sor_inv_sle_dx, sle_trans/ qed-.
+
+axiom sor_inv_sle: ∀f1,f2,f. f1 ⋓ f2 ≡ f → ∀g. f1 ⊆ g → f2 ⊆ g → f ⊆ g.
+
+(* Properties with inclusion ************************************************)
+
+corec lemma sor_sle_dx: ∀f1,f2. f1 ⊆ f2 → f1 ⋓ f2 ≡ f2.
+#f1 #f2 * -f1 -f2 /3 width=7 by sor_pp, sor_nn, sor_pn/
+qed.
+
+corec lemma sor_sle_sn: ∀f1,f2. f1 ⊆ f2 → f2 ⋓ f1 ≡ f2.
+#f1 #f2 * -f1 -f2 /3 width=7 by sor_pp, sor_nn, sor_np/
+qed.
+
+(* Main properties **********************************************************)
+
+axiom monotonic_sle_sor: ∀f1,g1. f1 ⊆ g1 → ∀f2,g2. f2 ⊆ g2 →
+ ∀f. f1 ⋓ f2 ≡ f → ∀g. g1 ⋓ g2 ≡ g → f ⊆ g.
+
+axiom sor_assoc_dx: ∀f0,f3,f4. f0 ⋓ f3 ≡ f4 →
+ ∀f1,f2. f1 ⋓ f2 ≡ f0 →
+ ∀f. f2 ⋓ f3 ≡ f → f1 ⋓ f ≡ f4.
+
+axiom sor_assoc_sn: ∀f1,f0,f4. f1 ⋓ f0 ≡ f4 →
+ ∀f2, f3. f2 ⋓ f3 ≡ f0 →
+ ∀f. f1 ⋓ f2 ≡ f → f ⋓ f3 ≡ f4.
+
+lemma sor_comm_23: ∀f0,f1,f2,f3,f4,f.
+ f0⋓f4 ≡ f1 → f1⋓f2 ≡ f → f0⋓f2 ≡ f3 → f3⋓f4 ≡ f.
+/4 width=6 by sor_comm, sor_assoc_dx/ qed-.
+
+corec theorem sor_comm_23_idem: ∀f0,f1,f2. f0 ⋓ f1 ≡ f2 →
+ ∀f. f1 ⋓ f2 ≡ f → f1 ⋓ f0 ≡ f.
+#f0 #f1 #f2 * -f0 -f1 -f2
+#f0 #f1 #f2 #g0 #g1 #g2 #Hf2 #H0 #H1 #H2 #g #Hg
+[ cases (sor_inv_ppx … Hg … H1 H2)
+| cases (sor_inv_pnx … Hg … H1 H2)
+| cases (sor_inv_nnx … Hg … H1 H2)
+| cases (sor_inv_nnx … Hg … H1 H2)
+] -g2 #f #Hf #H
+/3 width=7 by sor_nn, sor_np, sor_pn, sor_pp/
+qed-.
+
+corec theorem sor_coll_dx: ∀f1,f2,f. f1 ⋓ f2 ≡ f → ∀g1,g2,g. g1 ⋓ g2 ≡ g →
+ ∀g0. g1 ⋓ g0 ≡ f1 → g2 ⋓ g0 ≡ f2 → g ⋓ g0 ≡ f.
+#f1 #f2 #f cases (pn_split f) * #x #Hx #Hf #g1 #g2 #g #Hg #g0 #Hf1 #Hf2
+[ cases (sor_inv_xxp … Hf … Hx) -Hf #x1 #x2 #Hf #Hx1 #Hx2
+ cases (sor_inv_xxp … Hf1 … Hx1) -f1 #y1 #y0 #Hf1 #Hy1 #Hy0
+ cases (sor_inv_xpp … Hf2 … Hy0 … Hx2) -f2 #y2 #Hf2 #Hy2
+ cases (sor_inv_ppx … Hg … Hy1 Hy2) -g1 -g2 #y #Hg #Hy
+ @(sor_pp … Hy Hy0 Hx) -g -g0 -f /2 width=8 by/
+| cases (pn_split g) * #y #Hy
+ [ cases (sor_inv_xxp … Hg … Hy) -Hg #y1 #y2 #Hg #Hy1 #Hy2
+ cases (sor_xxn_tl … Hf … Hx) * #x1 #x2 #_ #Hx1 #Hx2
+ [ cases (sor_inv_pxn … Hf1 … Hy1 Hx1) -g1 #y0 #Hf1 #Hy0
+ cases (sor_inv_pnx … Hf2 … Hy2 Hy0) -g2 -x2 #x2 #Hf2 #Hx2
+ | cases (sor_inv_pxn … Hf2 … Hy2 Hx2) -g2 #y0 #Hf2 #Hy0
+ cases (sor_inv_pnx … Hf1 … Hy1 Hy0) -g1 -x1 #x1 #Hf1 #Hx1
+ ]
+ lapply (sor_inv_nnn … Hf … Hx1 Hx2 Hx) -f1 -f2 #Hf
+ @(sor_pn … Hy Hy0 Hx) -g -g0 -f /2 width=8 by/
+ | lapply (sor_tl … Hf) -Hf #Hf
+ lapply (sor_tl … Hg) -Hg #Hg
+ lapply (sor_tl … Hf1) -Hf1 #Hf1
+ lapply (sor_tl … Hf2) -Hf2 #Hf2
+ cases (pn_split g0) * #y0 #Hy0
+ [ @(sor_np … Hy Hy0 Hx) /2 width=8 by/
+ | @(sor_nn … Hy Hy0 Hx) /2 width=8 by/
+ ]
+ ]
+]
+qed-.
+
+corec theorem sor_distr_dx: ∀g0,g1,g2,g. g1 ⋓ g2 ≡ g →
+ ∀f1,f2,f. g1 ⋓ g0 ≡ f1 → g2 ⋓ g0 ≡ f2 → g ⋓ g0 ≡ f →
+ f1 ⋓ f2 ≡ f.
+#g0 cases (pn_split g0) * #y0 #H0 #g1 #g2 #g
+[ * -g1 -g2 -g #y1 #y2 #y #g1 #g2 #g #Hy #Hy1 #Hy2 #Hy #f1 #f2 #f #Hf1 #Hf2 #Hf
+ [ cases (sor_inv_ppx … Hf1 … Hy1 H0) -g1
+ cases (sor_inv_ppx … Hf2 … Hy2 H0) -g2
+ cases (sor_inv_ppx … Hf … Hy H0) -g
+ | cases (sor_inv_npx … Hf1 … Hy1 H0) -g1
+ cases (sor_inv_ppx … Hf2 … Hy2 H0) -g2
+ cases (sor_inv_npx … Hf … Hy H0) -g
+ | cases (sor_inv_ppx … Hf1 … Hy1 H0) -g1
+ cases (sor_inv_npx … Hf2 … Hy2 H0) -g2
+ cases (sor_inv_npx … Hf … Hy H0) -g
+ | cases (sor_inv_npx … Hf1 … Hy1 H0) -g1
+ cases (sor_inv_npx … Hf2 … Hy2 H0) -g2
+ cases (sor_inv_npx … Hf … Hy H0) -g
+ ] -g0 #y #Hy #H #y2 #Hy2 #H2 #y1 #Hy1 #H1
+ /3 width=8 by sor_nn, sor_np, sor_pn, sor_pp/
+| #H #f1 #f2 #f #Hf1 #Hf2 #Hf
+ cases (sor_xnx_tl … Hf1 … H0) -Hf1
+ cases (sor_xnx_tl … Hf2 … H0) -Hf2
+ cases (sor_xnx_tl … Hf … H0) -Hf
+ -g0 #y #x #Hx #Hy #H #y2 #x2 #Hx2 #Hy2 #H2 #y1 #x1 #Hx1 #Hy1 #H1
+ /4 width=8 by sor_tl, sor_nn/
+]
+qed-.
projects / helm.git / blobdiff