*)
definition match_step ≝ λsrc,dst,sig,n,is_startc,is_endc.
- compare src dst sig n ·
+ compare src dst sig n is_endc ·
(ifTM ?? (inject_TM ? (test_char ? (λa.is_endc a == false)) n src)
(single_finalTM ??
(parmove src dst sig n L is_startc · (inject_TM ? (move_r ?) n dst)))
definition R_match_step_false ≝
λsrc,dst,sig,n,is_endc.λint,outt: Vector (tape sig) (S n).
(((∃x.current ? (nth src ? int (niltape ?)) = Some ? x ∧ is_endc x = true) ∨
- (* current ? (nth src ? int (niltape ?)) ≠ current ? (nth dst ? int (niltape ?)) ∨ *)
current sig (nth src (tape sig) int (niltape sig)) = None ? ∨
current sig (nth dst (tape sig) int (niltape sig)) = None ? ) ∧ outt = int) ∨
- ∃ls,ls0,rs,rs0,x,xs. ∀rsi,rsj,end,c.
- rs = end::rsi → rs0 = c::rsj →
- is_endc x = false ∧ is_endc end = true ∧
- nth src ? int (niltape ?) = midtape sig ls x (xs@rs) ∧
+ (∃ls,ls0,rs,rs0,x,xs.
+ nth src ? int (niltape ?) = midtape sig ls x (xs@rs) ∧ is_endc x = false ∧
nth dst ? int (niltape ?) = midtape sig ls0 x (xs@rs0) ∧
+ ∀rsi,rsj,end,c.
+ rs = end::rsi → rs0 = c::rsj →
+ (∀c0. memb ? c0 (x::xs) = true → is_endc c0 = false) ∧ is_endc end = true ∧
+ nth dst ? int (niltape ?) = midtape sig ls0 x (xs@c::rsj) ∧
outt = change_vec ??
(change_vec ?? int (midtape sig (reverse ? xs@x::ls) end rsi) src)
- (midtape sig (reverse ? xs@x::ls0) c rsj) dst.
+ (midtape sig (reverse ? xs@x::ls0) c rsj) dst).
definition R_match_step_true ≝
λsrc,dst,sig,n,is_startc,is_endc.λint,outt: Vector (tape sig) (S n).
∀s.current sig (nth src (tape sig) int (niltape sig)) = Some ? s →
is_startc s = true →
(∀c.c ∈ right ? (nth src (tape sig) int (niltape sig)) = true → is_startc c = false) →
- (∀s1.current sig (nth dst (tape sig) int (niltape sig)) = Some ? s1 →
- s ≠ s1 →
+ (∀s1.current sig (nth dst (tape sig) int (niltape sig)) = Some ? s1 → s ≠ s1 →
outt = change_vec ?? int
(tape_move … (nth dst ? int (niltape ?)) (Some ? 〈s1,R〉)) dst ∧ is_endc s = false) ∧
(∀ls,x,xs,ci,rs,ls0,cj,rs0.
nth src ? int (niltape ?) = midtape sig ls x (xs@ci::rs) →
nth dst ? int (niltape ?) = midtape sig ls0 x (xs@cj::rs0) → ci ≠ cj →
+ (∀c0. memb ? c0 (x::xs) = true → is_endc c0 = false) →
outt = change_vec ?? int
(tape_move … (nth dst ? int (niltape ?)) (Some ? 〈x,R〉)) dst ∧ is_endc ci = false).
| @sym_eq @Hnth_j @sym_not_eq // ] ] ]
qed.
-axiom comp_list: ∀S:DeqSet. ∀l1,l2:list S. ∃l,tl1,tl2.
- l1 = l@tl1 ∧ l2 = l@tl2 ∧ ∀a,b,tla,tlb. tl1 = a::tla → tl2 = b::tlb → a≠b.
+axiom comp_list: ∀S:DeqSet. ∀l1,l2:list S.∀is_endc. ∃l,tl1,tl2.
+ l1 = l@tl1 ∧ l2 = l@tl2 ∧ (∀c.c ∈ l = true → is_endc c = false) ∧
+ ∀a,tla. tl1 = a::tla → is_endc a = true ∨ (∀b,tlb.tl2 = b::tlb → a≠b).
axiom daemon : ∀X:Prop.X.
R_match_step_true src dst sig n is_startc is_endc,
R_match_step_false src dst sig n is_endc ].
#src #dst #sig #n #is_startc #is_endc #Hneq #Hsrc #Hdst
-@(acc_sem_seq_app sig n … (sem_compare src dst sig n Hneq Hsrc Hdst)
+@(acc_sem_seq_app sig n … (sem_compare src dst sig n is_endc Hneq Hsrc Hdst)
(acc_sem_if ? n … (sem_test_char_multi sig (λa.is_endc a == false) n src (le_S_S_to_le … Hsrc))
(sem_seq …
(sem_parmoveL ???? is_startc Hneq Hsrc Hdst)
#Htb #s #Hcurta_src #Hstart #Hnotstart %
[ #s1 #Hcurta_dst #Hneqss1
lapply Htb lapply Hcurtc -Htb -Hcurtc >(?:tc=ta)
- [|@Hcomp1 % % >Hcurta_src >Hcurta_dst @(not_to_not … Hneqss1) #H destruct (H) % ]
+ [|@Hcomp1 %2 % % >Hcurta_src >Hcurta_dst @(not_to_not … Hneqss1) #H destruct (H) % ]
#Hcurtc * #te * * #_ #Hte >Hte // whd in ⊢ (%→?); * * #_ #Htbdst #Htbelse %
[ @(eq_vec … (niltape ?)) #i #Hi cases (decidable_eq_nat i dst) #Hidst
[ >Hidst >nth_change_vec // cases (current_to_midtape … Hcurta_dst)
| >nth_change_vec_neq [|@sym_not_eq //] @sym_eq @Htbelse @sym_not_eq // ]
| >Hcurtc in Hcurta_src; #H destruct (H) cases (is_endc s) in Hcend;
normalize #H destruct (H) // ]
- |#ls #x #xs #ci #rs #ls0 #cj #rs0 #Htasrc_mid #Htadst_mid #Hcicj
- lapply (Hcomp2 … Htasrc_mid Htadst_mid Hcicj) -Hcomp2 #Hcomp2
+ |#ls #x #xs #ci #rs #ls0 #cj #rs0 #Htasrc_mid #Htadst_mid #Hcicj #Hnotendc
+ lapply (Hcomp2 … Htasrc_mid Htadst_mid Hnotendc (or_intror ?? Hcicj))
+ -Hcomp2 #Hcomp2
cases Htb #td * * #Htd #_ >Htasrc_mid in Hcurta_src; normalize in ⊢ (%→?);
#H destruct (H)
>(Htd ls ci (reverse ? xs) rs s ??? ls0 cj (reverse ? xs) s rs0 (refl ??)) //
whd in ⊢ (%→?); #Hout >Hout >Htb whd
lapply (current_to_midtape sig (nth src ? intape (niltape ?)))
cases (current … (nth src ? intape (niltape ?))) in Hcomp1;
- [#Hcomp1 #_ %1 % [%1 %2 // | @Hcomp1 %1 %2 %]
+ [#Hcomp1 #_ %1 % [%1 %2 // | @Hcomp1 %2 %1 %2 %]
|#c_src lapply (current_to_midtape sig (nth dst ? intape (niltape ?)))
cases (current … (nth dst ? intape (niltape ?)))
- [#_ #Hcomp1 #_ %1 % [%2 % | @Hcomp1 %2 %]
+ [#_ #Hcomp1 #_ %1 % [%2 % | @Hcomp1 %2 % % % #H destruct (H)]
|#c_dst cases (true_or_false (c_src == c_dst)) #Hceq
[#Hmid_dst cases (Hmid_dst c_dst (refl …)) -Hmid_dst
- #ls_dst * #rs_dst #Hmid_dst #_
+ #ls_dst * #rs_dst #Hmid_dst #Hcomp1
#Hmid_src cases (Hmid_src c_src (refl …)) -Hmid_src
- #ls_src * #rs_src #Hmid_src %2
- cases (comp_list … rs_src rs_dst) #xs * #rsi * #rsj * *
- #Hrs_src #Hrs_dst #Hneq
- %{ls_src} %{ls_dst} %{rsi} %{rsj} %{c_src} %{xs}
- #rsi0 #rsj0 #end #c #Hend #Hc_dst
- >Hrs_src in Hmid_src; >Hend #Hmid_src
- >Hrs_dst in Hmid_dst; >Hc_dst <(\P Hceq) #Hmid_dst
- lapply(Hcomp2 … Hmid_src Hmid_dst ?)
- [@(Hneq … Hend Hc_dst)]
- -Hcomp2 #Hcomp2 <Hcomp2
- % // % [ %
- [>Hcomp2 in Hc; >nth_change_vec_neq [|@sym_not_eq //]
- >nth_change_vec // #H lapply (H ? (refl …))
- cases (is_endc end) normalize //
- |@Hmid_src]
- |@Hmid_dst]
+ #ls_src * #rs_src #Hmid_src
+ cases (true_or_false (is_endc c_src)) #Hc_src
+ [ % % [ % % %{c_src} % // | @Hcomp1 % %{c_src} % // ]
+ | %2 cases (comp_list … rs_src rs_dst is_endc) #xs * #rsi * #rsj * * *
+ #Hrs_src #Hrs_dst #Hnotendc #Hneq
+ %{ls_src} %{ls_dst} %{rsi} %{rsj} %{c_src} %{xs} %
+ [% [% // <Hrs_src //|<Hrs_dst >(\P Hceq) // ]]
+ #rsi0 #rsj0 #end #c #Hend #Hc_dst
+ >Hrs_src in Hmid_src; >Hend #Hmid_src
+ >Hrs_dst in Hmid_dst; >Hc_dst <(\P Hceq) #Hmid_dst
+ cut (is_endc end = true ∨ end ≠ c)
+ [cases (Hneq … Hend) /2/ -Hneq #Hneq %2 @(Hneq … Hc_dst) ] #Hneq
+ lapply (Hcomp2 … Hmid_src Hmid_dst ? Hneq)
+ [#c0 #Hc0 cases (orb_true_l … Hc0) -Hc0 #Hc0
+ [ >(\P Hc0) //
+ | @Hnotendc // ]
+ ]
+ -Hcomp2 #Hcomp2 <Hcomp2
+ % // % [
+ >Hcomp2 in Hc; >nth_change_vec_neq [|@sym_not_eq //]
+ >nth_change_vec // #H lapply (H ? (refl …))
+ cases (is_endc end) [|normalize #H destruct (H) ]
+ #_ % // #c0 #Hc0 cases (orb_true_l … Hc0) -Hc0 #Hc0
+ [ >(\P Hc0) // | @Hnotendc // ]
+ |@Hmid_dst]
+ ]
|#_ #Hcomp1 #Hsrc cases (Hsrc ? (refl ??)) -Hsrc #ls * #rs #Hsrc
%1 %
[% % %{c_src} % // lapply (Hc c_src) -Hc >Hcomp1
- [| % % @(not_to_not ??? (\Pf Hceq)) #H destruct (H) // ]
+ [| %2 % % @(not_to_not ??? (\Pf Hceq)) #H destruct (H) // ]
cases (is_endc c_src) //
>Hsrc #Hc lapply (Hc (refl ??)) normalize #H destruct (H)
- |@Hcomp1 %1 %1 @(not_to_not ??? (\Pf Hceq)) #H destruct (H) //
+ |@Hcomp1 %2 %1 %1 @(not_to_not ??? (\Pf Hceq)) #H destruct (H) //
]
]
]
(((∃x.current ? (nth i ? int (niltape ?)) = Some ? x ∧ is_endc x = true) ∨
current ? (nth i ? int (niltape ?)) = None ? ∨
current ? (nth j ? int (niltape ?)) = None ?) → outt = int) ∧
- (∀ls,x,xs,ci,rs,ls0,x0,rs0.
+ (∀ls,x,xs,ci,rs,ls0,x0,rs0.
+ (∀x. is_startc x ≠ is_endc x) →
is_startc x = true → is_endc ci = true →
+ (∀z. memb ? z (x::xs) = true → is_endc x = false) →
nth i ? int (niltape ?) = midtape sig ls x (xs@ci::rs) →
nth j ? int (niltape ?) = midtape sig ls0 x0 rs0 →
- ∃l,cj,l1.x0::rs0 = l@x::xs@cj::l1 ∧
- outt = change_vec ??
- (change_vec ?? int (midtape sig (reverse ? xs@x::ls) ci rs) i)
- (midtape sig ((reverse ? (l@x::xs))@ls0) cj l1) j).
+ (∃l,l1.x0::rs0 = l@x::xs@l1 →
+ ∀cj,l2.l1=cj::l2 →
+ outt = change_vec ??
+ (change_vec ?? int (midtape sig (reverse ? xs@x::ls) ci rs) i)
+ (midtape sig ((reverse ? (l@x::xs))@ls0) cj l2) j) ∨
+ ∀l,l1.x0::rs0 ≠ l@x::xs@l1).
+
+axiom sub_list_dec: ∀A.∀l,ls:list A.
+ ∃l1,l2. l = l1@ls@l2 ∨ ∀l1,l2. l ≠ l1@ls@l2.
lemma wsem_match_m : ∀src,dst,sig,n,is_startc,is_endc.
src ≠ dst → src < S n → dst < S n →
#src #dst #sig #n #is_startc #is_endc #Hneq #Hsrc #Hdst #ta #k #outc #Hloop
lapply (sem_while … (sem_match_step src dst sig n is_startc is_endc Hneq Hsrc Hdst) … Hloop) //
-Hloop * #tb * #Hstar @(star_ind_l ??????? Hstar) -Hstar
-[ #tc whd in ⊢ (%→?); *
+[ #tc whd in ⊢ (%→%); *
[ * * [ *
[ * #cur_src * #H1 #H2 #Houtc %
[ #_ @Houtc
- | #ls #x #xs #ci #rs #ls0 #cj #rs0 #_ #_ #Hnthi #Hnthj
- >Hnthi in Hcicj; >Hnthj normalize in ⊢ (%→?); * #H @False_ind @H %
+ | #ls #x #xs #ci #rs #ls0 #cj #rs0 #Hdiff #Hstartc #Hendc #Hnotend #Hnthi
+ @False_ind
+ >Hnthi in H1; whd in ⊢ (??%?→?); #H destruct (H) cases (Hdiff cur_src)
+ #Habs @Habs //
]
- | #Hci #Houtc %
- [ #_ @Houtc
- | #ls #x #xs #ci #rs #ls0 #cj #rs0 #Hnthi >Hnthi in Hci;
- normalize in ⊢ (%→?); #H destruct (H) ] ]
- | #Hcj #Houtc %
- [ #_ @Houtc
- | #ls #x #xs #ci #rs #ls0 #cj #rs0 #_ #Hnthj >Hnthj in Hcj;
- normalize in ⊢ (%→?); #H destruct (H) ] ]
-
-
-
-[ #tc whd in ⊢ (%→?); * * [ *
+ | #Hci #Houtc %
+ [ #_ @Houtc
+ | #ls #x #xs #ci #rs #ls0 #cj #rs0 #Hdiff #Hstartc #Hendc #Hnotend
+ #Hnthi >Hnthi in Hci; normalize in ⊢ (%→?); #H destruct (H) ] ]
+ | #Hcj #Houtc %
+ [ #_ @Houtc
+ | #ls #x #xs #ci #rs #ls0 #cj #rs0 #Hdiff #Hstartc #Hendc #_ #_ #Hnthj >Hnthj in Hcj;
+ normalize in ⊢ (%→?); #H destruct (H) ]
+ ]
+ |* #ls * #ls0 * #rs * #rs0 * #x0 * #xs * * * #Hsrc #Hx0 #Hdst #H %
+ [>Hsrc *
+ [* [* #x * whd in ⊢ (??%?→?); #Habs destruct (Habs) >Hx0 #Habs destruct (Habs)
+ |whd in ⊢ (??%?→?); #Habs destruct (Habs) ]
+ |>Hdst whd in ⊢ (??%?→?); #Habs destruct (Habs) ]
+ |#ls1 #x1 #xs1 #ci #rsi #ls2 #x2 #rs2
+ #Hdiff #Hstart #Hend #Hnotend
+ >Hsrc #Hsrc1 destruct (Hsrc1) >Hdst #Hdst1 destruct (Hdst1)
+ %1 %{[ ]} %{rs0} normalize in ⊢ (%→?); #Heq #cj #l2 #Hl1
+ cut (xs=xs1)
+ [@(append_l1_injective_r … rs0 rs0 (refl …)) @(cons_injective_r …Heq)]
+ #eqxs <eqxs
+ whd in match (append ? [ ] (x2::xs)); >reverse_cons >associative_append
+ normalize in match (append ? [x2] ls2);
+ cases (H rsi l2 ci cj ? Hl1)
+ [* #_ #_ #H3 @H3
+ |>eqxs in e0; #e0 @(append_l2_injective … e0) //
+ ]
+ ]
+ ]
+|
+
+
+ cases (comp_list ? (x1::xs1@ci::rsi) (x2::rs2) is_endc)
+ #l * #tl1 * #tl2 * * * #H1 #H2 #H3 #H4