##]
nqed.
-nlemma symmetric_foldrightlist2_aux
- : ∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.∀acc:T2.∀l1,l2:list T1.
- ∀H1:len_list T1 l1 = len_list T1 l2.∀H2:len_list T1 l2 = len_list T1 l1.
- (∀x,y,z.f x y z = f y x z) →
- fold_right_list2 T1 T2 f acc l1 l2 H1 = fold_right_list2 T1 T2 f acc l2 l1 H2.
- #T1; #T2; #f; #acc; #l1;
+nlemma symmetric_foldrightlist2_aux :
+∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.
+ (∀x,y,z.f x y z = f y x z) →
+ (∀acc:T2.∀l1,l2:list T1.
+ ∀H1:(len_list T1 l1 = len_list T1 l2).
+ ∀H2:(len_list T1 l2 = len_list T1 l1).
+ (fold_right_list2 T1 T2 f acc l1 l2 H1 = fold_right_list2 T1 T2 f acc l2 l1 H2)).
+ #T1; #T2; #f; #H; #acc; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: nnormalize; #H1; #H2; #H3; napply refl_eq
- ##| ##2: #h; #l; #H1; #H2; #H3;
+ ##[ ##1: nnormalize; #H1; #H2; napply refl_eq
+ ##| ##2: #h; #l; #H1; #H2;
nchange in H1:(%) with (O = (S (len_list ? l)));
ndestruct (*nelim (nat_destruct_0_S ? H1)*)
##]
- ##| ##2: #h3; #l3; #H; #l2; ncases l2;
- ##[ ##1: #H1; #H2; #H3; nchange in H1:(%) with ((S (len_list ? l3)) = O);
+ ##| ##2: #h3; #l3; #H1; #l2; ncases l2;
+ ##[ ##1: #H2; #H3; nchange in H2:(%) with ((S (len_list ? l3)) = O);
ndestruct (*nelim (nat_destruct_S_0 ? H1)*)
- ##| ##2: #h4; #l4; #H1; #H2; #H3;
- nchange in H1:(%) with ((S (len_list ? l3)) = (S (len_list ? l4)));
- nchange in H2:(%) with ((S (len_list ? l4)) = (S (len_list ? l3)));
+ ##| ##2: #h4; #l4; #H2; #H3;
+ nchange in H2:(%) with ((S (len_list ? l3)) = (S (len_list ? l4)));
+ nchange in H3:(%) with ((S (len_list ? l4)) = (S (len_list ? l3)));
nchange with ((f h3 h4 (fold_right_list2 T1 T2 f acc l3 l4 (fold_right_list2_aux3 T1 h3 h4 l3 l4 ?))) =
(f h4 h3 (fold_right_list2 T1 T2 f acc l4 l3 (fold_right_list2_aux3 T1 h4 h3 l4 l3 ?))));
- nrewrite < (H l4 (fold_right_list2_aux3 T1 h3 h4 l3 l4 H1) (fold_right_list2_aux3 T1 h4 h3 l4 l3 H2) H3);
- nrewrite > (H3 h3 h4 (fold_right_list2 T1 T2 f acc l3 l4 ?));
+ nrewrite < (H1 l4 (fold_right_list2_aux3 T1 h3 h4 l3 l4 H2) (fold_right_list2_aux3 T1 h4 h3 l4 l3 H3));
+ nrewrite > (H h3 h4 (fold_right_list2 T1 T2 f acc l3 l4 ?));
napply refl_eq
##]
##]
nqed.
-nlemma symmetric_foldrightlist2
- : ∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.∀acc:T2.∀l1,l2:list T1.∀H:len_list T1 l1 = len_list T1 l2.
- (∀x,y,z.f x y z = f y x z) →
- fold_right_list2 T1 T2 f acc l1 l2 H = fold_right_list2 T1 T2 f acc l2 l1 (symmetric_lenlist T1 l1 l2 H).
- #T1; #T2; #f; #acc; #l1; #l2; #H; #H1;
- nrewrite > (symmetric_foldrightlist2_aux T1 T2 f acc l1 l2 H (symmetric_lenlist T1 l1 l2 H) H1);
+nlemma symmetric_foldrightlist2 :
+∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.
+ (∀x,y,z.f x y z = f y x z) →
+ (∀acc:T2.∀l1,l2:list T1.∀H:len_list T1 l1 = len_list T1 l2.
+ fold_right_list2 T1 T2 f acc l1 l2 H = fold_right_list2 T1 T2 f acc l2 l1 (symmetric_lenlist T1 l1 l2 H)).
+ #T1; #T2; #f; #H; #acc; #l1; #l2; #H1;
+ nrewrite > (symmetric_foldrightlist2_aux T1 T2 f H acc l1 l2 H1 (symmetric_lenlist T1 l1 l2 H1));
napply refl_eq.
nqed.
-nlemma symmetric_bfoldrightlist2
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:list T1.
- (∀x,y.f x y = f y x) →
- bfold_right_list2 T1 f l1 l2 = bfold_right_list2 T1 f l2 l1.
- #T; #f; #l1;
+nlemma symmetric_bfoldrightlist2 :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.f x y = f y x) →
+ (∀l1,l2:list T1.
+ bfold_right_list2 T1 f l1 l2 = bfold_right_list2 T1 f l2 l1).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: #H; nnormalize; napply refl_eq
- ##| ##2: #hh2; #ll2; #H; nnormalize; napply refl_eq
+ ##[ ##1: nnormalize; napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize; napply refl_eq
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #H1; nnormalize; napply refl_eq
- ##| ##2: #hh2; #ll2; #H1; nnormalize;
- nrewrite > (H ll2 H1);
- nrewrite > (H1 hh1 hh2);
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: nnormalize; napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize;
+ nrewrite > (H1 ll2);
+ nrewrite > (H hh1 hh2);
napply refl_eq
##]
##]
nqed.
-nlemma bfoldrightlist2_to_eq
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:list T1.
- (∀x,y.(f x y = true → x = y)) →
- (bfold_right_list2 T1 f l1 l2 = true → l1 = l2).
- #T; #f; #l1;
+nlemma bfoldrightlist2_to_eq :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(f x y = true → x = y)) →
+ (∀l1,l2:list T1.
+ (bfold_right_list2 T1 f l1 l2 = true → l1 = l2)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: #H; #H1; napply refl_eq
- ##| ##2: #hh2; #ll2; #H; nnormalize; #H1;
+ ##[ ##1: #H1; napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize; #H1;
ndestruct (*napply (bool_destruct … H1)*)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #H1; nnormalize; #H2;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: nnormalize; #H2;
ndestruct (*napply (bool_destruct … H2)*)
- ##| ##2: #hh2; #ll2; #H1; #H2;
+ ##| ##2: #hh2; #ll2; #H2;
nchange in H2:(%) with (((f hh1 hh2)⊗(bfold_right_list2 T f ll1 ll2)) = true);
- nrewrite > (H1 hh1 hh2 (andb_true_true_l … H2));
- nrewrite > (H ll2 H1 (andb_true_true_r … H2));
+ nrewrite > (H hh1 hh2 (andb_true_true_l … H2));
+ nrewrite > (H1 ll2 (andb_true_true_r … H2));
napply refl_eq
##]
##]
nqed.
-nlemma eq_to_bfoldrightlist2
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:list T1.
- (∀x,y.(x = y → f x y = true)) →
- (l1 = l2 → bfold_right_list2 T1 f l1 l2 = true).
- #T; #f; #l1;
+nlemma eq_to_bfoldrightlist2 :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(x = y → f x y = true)) →
+ (∀l1,l2:list T1.
+ (l1 = l2 → bfold_right_list2 T1 f l1 l2 = true)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: #H; #H1; nnormalize; napply refl_eq
- ##| ##2: #hh2; #ll2; #H; #H1;
+ ##[ ##1: #H1; nnormalize; napply refl_eq
+ ##| ##2: #hh2; #ll2; #H1;
(* !!! ndestruct: assert false *)
nelim (list_destruct_nil_cons ??? H1)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #H1; #H2;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #H2;
(* !!! ndestruct: assert false *)
nelim (list_destruct_cons_nil ??? H2)
- ##| ##2: #hh2; #ll2; #H1; #H2; nnormalize;
+ ##| ##2: #hh2; #ll2; #H2; nnormalize;
nrewrite > (list_destruct_1 … H2);
- nrewrite > (H1 hh2 hh2 (refl_eq …));
+ nrewrite > (H hh2 hh2 (refl_eq …));
nnormalize;
- nrewrite > (H ll2 H1 (list_destruct_2 … H2));
+ nrewrite > (H1 ll2 (list_destruct_2 … H2));
napply refl_eq
##]
##]
nqed.
-nlemma bfoldrightlist2_to_lenlist
- : ∀T.∀f:T → T → bool.∀l1,l2:list T.bfold_right_list2 T f l1 l2 = true → len_list T l1 = len_list T l2.
+nlemma bfoldrightlist2_to_lenlist :
+∀T.∀f:T → T → bool.
+ (∀l1,l2:list T.bfold_right_list2 T f l1 l2 = true → len_list T l1 = len_list T l2).
#T; #f; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
##]
nqed.
-nlemma decidable_list : ∀T.∀H:(Πx,y:T.decidable (x = y)).∀x,y:list T.decidable (x = y).
+nlemma decidable_list :
+∀T.(∀x,y:T.decidable (x = y)) →
+ (∀x,y:list T.decidable (x = y)).
#T; #H; #x; nelim x;
##[ ##1: #y; ncases y;
##[ ##1: nnormalize; napply (or2_intro1 (? = ?) (? ≠ ?) (refl_eq …))
##]
nqed.
-nlemma nbfoldrightlist2_to_neq
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:list T1.
- (∀x,y.(f x y = false → x ≠ y)) →
- (bfold_right_list2 T1 f l1 l2 = false → l1 ≠ l2).
- #T; #f; #l1;
+nlemma nbfoldrightlist2_to_neq :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(f x y = false → x ≠ y)) →
+ (∀l1,l2:list T1.
+ (bfold_right_list2 T1 f l1 l2 = false → l1 ≠ l2)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: #H; nnormalize; #H1;
+ ##[ ##1: nnormalize; #H1;
ndestruct (*napply (bool_destruct … H1)*)
- ##| ##2: #hh2; #ll2; #H; #H1; nnormalize; #H2;
+ ##| ##2: #hh2; #ll2; #H1; nnormalize; #H2;
(* !!! ndestruct: assert false *)
napply (list_destruct_nil_cons T … H2)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #H1; #H2; nnormalize; #H3;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #H2; nnormalize; #H3;
(* !!! ndestruct: assert false *)
napply (list_destruct_cons_nil T … H3)
- ##| ##2: #hh2; #ll2; #H1; #H2; nnormalize; #H3;
+ ##| ##2: #hh2; #ll2; #H2; nnormalize; #H3;
nchange in H2:(%) with (((f hh1 hh2)⊗(bfold_right_list2 T f ll1 ll2)) = false);
- napply (H ll2 H1 ? (list_destruct_2 T … H3));
+ napply (H1 ll2 ? (list_destruct_2 T … H3));
napply (or2_elim ??? (andb_false2 … H2) );
##[ ##1: #H4; napply (absurd (hh1 = hh2) …);
##[ ##1: nrewrite > (list_destruct_1 T … H3); napply refl_eq
- ##| ##2: napply (H1 … H4)
+ ##| ##2: napply (H … H4)
##]
##| ##2: #H4; napply H4
##]
##]
nqed.
-nlemma list_destruct
- : ∀T.∀H:(Πx,y:T.decidable (x = y)).∀h1,h2:T.∀l1,l2:list T.(h1::l1) ≠ (h2::l2) → h1 ≠ h2 ∨ l1 ≠ l2.
+nlemma list_destruct :
+∀T.(∀x,y:T.decidable (x = y)) →
+ (∀h1,h2:T.∀l1,l2:list T.
+ (h1::l1) ≠ (h2::l2) → h1 ≠ h2 ∨ l1 ≠ l2).
#T; #H; #h1; #h2; #l1; nelim l1;
##[ ##1: #l2; ncases l2;
##[ ##1: #H1; napply (or2_intro1 (h1 ≠ h2) ([] ≠ []) …);
##]
nqed.
-nlemma neq_to_nbfoldrightlist2
- : ∀T:Type.∀f:T → T → bool.∀l1,l2:list T.
- (∀x,y:T.decidable (x = y)) →
- (∀x,y.(x ≠ y → f x y = false)) →
- (l1 ≠ l2 → bfold_right_list2 T f l1 l2 = false).
- #T; #f; #l1;
+nlemma neq_to_nbfoldrightlist2 :
+∀T:Type.∀f:T → T → bool.
+ (∀x,y:T.decidable (x = y)) →
+ (∀x,y.(x ≠ y → f x y = false)) →
+ (∀l1,l2:list T.
+ (l1 ≠ l2 → bfold_right_list2 T f l1 l2 = false)).
+ #T; #f; #H; #H1; #l1;
nelim l1;
##[ ##1: #l2; ncases l2;
- ##[ ##1: #H; #H1; nnormalize; #H2; nelim (H2 (refl_eq …))
- ##| ##2: #hh2; #ll2; #H; nnormalize; #H1; #H2; napply refl_eq
+ ##[ ##1: nnormalize; #H2; nelim (H2 (refl_eq …))
+ ##| ##2: #hh2; #ll2; nnormalize; #H2; napply refl_eq
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #H1; #H2; nnormalize; #H3; napply refl_eq
- ##| ##2: #hh2; #ll2; #H1; #H2; #H3;
+ ##| ##2: #hh1; #ll1; #H2; #l2; ncases l2;
+ ##[ ##1: nnormalize; #H3; napply refl_eq
+ ##| ##2: #hh2; #ll2; #H3;
nchange with (((f hh1 hh2)⊗(bfold_right_list2 T f ll1 ll2)) = false);
- napply (or2_elim (hh1 ≠ hh2) (ll1 ≠ ll2) ? (list_destruct T H1 … H3) …);
- ##[ ##1: #H4; nrewrite > (H2 hh1 hh2 H4); nnormalize; napply refl_eq
- ##| ##2: #H4; nrewrite > (H ll2 H1 H2 H4);
+ napply (or2_elim (hh1 ≠ hh2) (ll1 ≠ ll2) ? (list_destruct T H … H3) …);
+ ##[ ##1: #H4; nrewrite > (H1 hh1 hh2 H4); nnormalize; napply refl_eq
+ ##| ##2: #H4; nrewrite > (H2 ll2 H4);
nrewrite > (symmetric_andbool (f hh1 hh2) false);
nnormalize; napply refl_eq
##]
##]
nqed.
-nlemma symmetric_foldrightnelist2_aux
- : ∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.∀acc:T2.∀l1,l2:ne_list T1.
- ∀H1:len_neList T1 l1 = len_neList T1 l2.∀H2:len_neList T1 l2 = len_neList T1 l1.
- (∀x,y,z.f x y z = f y x z) →
- fold_right_neList2 T1 T2 f acc l1 l2 H1 = fold_right_neList2 T1 T2 f acc l2 l1 H2.
- #T1; #T2; #f; #acc; #l1;
+nlemma symmetric_foldrightnelist2_aux :
+∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.
+ (∀x,y,z.f x y z = f y x z) →
+ (∀acc:T2.∀l1,l2:ne_list T1.
+ ∀H1:len_neList T1 l1 = len_neList T1 l2.∀H2:len_neList T1 l2 = len_neList T1 l1.
+ fold_right_neList2 T1 T2 f acc l1 l2 H1 = fold_right_neList2 T1 T2 f acc l2 l1 H2).
+ #T1; #T2; #f; #H; #acc; #l1;
nelim l1;
##[ ##1: #h; #l2; ncases l2;
- ##[ ##1: #h1; nnormalize; #H1; #H2; #H3; nrewrite > (H3 h h1 acc); napply refl_eq
+ ##[ ##1: #h1; nnormalize; #H1; #H2; nrewrite > (H h h1 acc); napply refl_eq
##| ##2: #h1; #l; ncases l;
- ##[ ##1: #h3; #H1; #H2; #H3;
+ ##[ ##1: #h3; #H1; #H2;
nchange in H1:(%) with ((S O) = (S (S O)));
(* !!! ndestruct: si inceppa su un'ipotesi che non e' H1 *)
nelim (nat_destruct_0_S ? (nat_destruct_S_S … H1))
- ##| ##2: #h3; #l3; #H1; #H2; #H3;
+ ##| ##2: #h3; #l3; #H1; #H2;
nchange in H1:(%) with ((S O) = (S (S (len_neList ? l3))));
(* !!! ndestruct: si inceppa su un'ipotesi che non e' H1 *)
nelim (nat_destruct_0_S ? (nat_destruct_S_S … H1))
##]
##]
- ##| ##2: #h3; #l3; #H; #l2; ncases l2;
+ ##| ##2: #h3; #l3; #H1; #l2; ncases l2;
##[ ##1: #h4; ncases l3;
- ##[ ##1: #h5; #H1; #H2; #H3;
- nchange in H1:(%) with ((S (S O)) = (S O));
+ ##[ ##1: #h5; #H2; #H3;
+ nchange in H2:(%) with ((S (S O)) = (S O));
(* !!! ndestruct: si inceppa su un'ipotesi che non e' H1 *)
- nelim (nat_destruct_S_0 ? (nat_destruct_S_S … H1))
- ##| ##2: #h5; #l5; #H1; #H2; #H3;
- nchange in H1:(%) with ((S (S (len_neList ? l5))) = (S O));
+ nelim (nat_destruct_S_0 ? (nat_destruct_S_S … H2))
+ ##| ##2: #h5; #l5; #H2; #H3;
+ nchange in H2:(%) with ((S (S (len_neList ? l5))) = (S O));
(* !!! ndestruct: si inceppa su un'ipotesi che non e' H1 *)
- nelim (nat_destruct_S_0 ? (nat_destruct_S_S … H1))
+ nelim (nat_destruct_S_0 ? (nat_destruct_S_S … H2))
##]
- ##| ##2: #h4; #l4; #H1; #H2; #H3;
- nchange in H1:(%) with ((S (len_neList ? l3)) = (S (len_neList ? l4)));
- nchange in H2:(%) with ((S (len_neList ? l4)) = (S (len_neList ? l3)));
+ ##| ##2: #h4; #l4; #H2; #H3;
+ nchange in H2:(%) with ((S (len_neList ? l3)) = (S (len_neList ? l4)));
+ nchange in H3:(%) with ((S (len_neList ? l4)) = (S (len_neList ? l3)));
nchange with ((f h3 h4 (fold_right_neList2 T1 T2 f acc l3 l4 (fold_right_neList2_aux3 T1 h3 h4 l3 l4 ?))) =
(f h4 h3 (fold_right_neList2 T1 T2 f acc l4 l3 (fold_right_neList2_aux3 T1 h4 h3 l4 l3 ?))));
- nrewrite < (H l4 (fold_right_neList2_aux3 T1 h3 h4 l3 l4 H1) (fold_right_neList2_aux3 T1 h4 h3 l4 l3 H2) H3);
- nrewrite > (H3 h3 h4 (fold_right_neList2 T1 T2 f acc l3 l4 ?));
+ nrewrite < (H1 l4 (fold_right_neList2_aux3 T1 h3 h4 l3 l4 H2) (fold_right_neList2_aux3 T1 h4 h3 l4 l3 H3));
+ nrewrite > (H h3 h4 (fold_right_neList2 T1 T2 f acc l3 l4 ?));
napply refl_eq
##]
##]
nqed.
-nlemma symmetric_foldrightnelist2
- : ∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.∀acc:T2.∀l1,l2:ne_list T1.∀H:len_neList T1 l1 = len_neList T1 l2.
- (∀x,y,z.f x y z = f y x z) →
- fold_right_neList2 T1 T2 f acc l1 l2 H = fold_right_neList2 T1 T2 f acc l2 l1 (symmetric_lennelist T1 l1 l2 H).
- #T1; #T2; #f; #acc; #l1; #l2; #H; #H1;
- nrewrite > (symmetric_foldrightnelist2_aux T1 T2 f acc l1 l2 H (symmetric_lennelist T1 l1 l2 H) H1);
+nlemma symmetric_foldrightnelist2 :
+∀T1,T2:Type.∀f:T1 → T1 → T2 → T2.
+ (∀x,y,z.f x y z = f y x z) →
+ (∀acc:T2.∀l1,l2:ne_list T1.∀H:len_neList T1 l1 = len_neList T1 l2.
+ fold_right_neList2 T1 T2 f acc l1 l2 H = fold_right_neList2 T1 T2 f acc l2 l1 (symmetric_lennelist T1 l1 l2 H)).
+ #T1; #T2; #f; #H; #acc; #l1; #l2; #H1;
+ nrewrite > (symmetric_foldrightnelist2_aux T1 T2 f H acc l1 l2 H1 (symmetric_lennelist T1 l1 l2 H1));
napply refl_eq.
nqed.
-nlemma symmetric_bfoldrightnelist2
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:ne_list T1.
- (∀x,y.f x y = f y x) →
- bfold_right_neList2 T1 f l1 l2 = bfold_right_neList2 T1 f l2 l1.
- #T; #f; #l1;
+nlemma symmetric_bfoldrightnelist2 :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.f x y = f y x) →
+ (∀l1,l2:ne_list T1.
+ bfold_right_neList2 T1 f l1 l2 = bfold_right_neList2 T1 f l2 l1).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
- ##[ ##1: #hh2; #H; nnormalize; nrewrite > (H hh1 hh2); napply refl_eq
- ##| ##2: #hh2; #ll2; #H; nnormalize; napply refl_eq
- ##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #hh2; #H1; nnormalize; napply refl_eq
- ##| ##2: #hh2; #ll2; #H1; nnormalize;
- nrewrite > (H ll2 H1);
- nrewrite > (H1 hh1 hh2);
+ ##[ ##1: #hh2; nnormalize; nrewrite > (H hh1 hh2); napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize; napply refl_eq
+ ##]
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #hh2; nnormalize; napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize;
+ nrewrite > (H1 ll2);
+ nrewrite > (H hh1 hh2);
napply refl_eq
##]
##]
nqed.
-nlemma bfoldrightnelist2_to_eq
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:ne_list T1.
- (∀x,y.(f x y = true → x = y)) →
- (bfold_right_neList2 T1 f l1 l2 = true → l1 = l2).
- #T; #f; #l1;
+nlemma bfoldrightnelist2_to_eq :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(f x y = true → x = y)) →
+ (∀l1,l2:ne_list T1.
+ (bfold_right_neList2 T1 f l1 l2 = true → l1 = l2)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
- ##[ ##1: #hh2; #H; #H1; nnormalize in H1:(%); nrewrite > (H hh1 hh2 H1); napply refl_eq
- ##| ##2: #hh2; #ll2; #H; nnormalize; #H1; ndestruct (*napply (bool_destruct … H1)*)
+ ##[ ##1: #hh2; #H1; nnormalize in H1:(%); nrewrite > (H hh1 hh2 H1); napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize; #H1; ndestruct (*napply (bool_destruct … H1)*)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #hh2; #H1; nnormalize; #H2; ndestruct (*napply (bool_destruct … H2)*)
- ##| ##2: #hh2; #ll2; #H1; #H2;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #hh2; nnormalize; #H2; ndestruct (*napply (bool_destruct … H2)*)
+ ##| ##2: #hh2; #ll2; #H2;
nchange in H2:(%) with (((f hh1 hh2)⊗(bfold_right_neList2 T f ll1 ll2)) = true);
- nrewrite > (H1 hh1 hh2 (andb_true_true_l … H2));
- nrewrite > (H ll2 H1 (andb_true_true_r … H2));
+ nrewrite > (H hh1 hh2 (andb_true_true_l … H2));
+ nrewrite > (H1 ll2 (andb_true_true_r … H2));
napply refl_eq
##]
##]
nqed.
-nlemma eq_to_bfoldrightnelist2
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:ne_list T1.
- (∀x,y.(x = y → f x y = true)) →
- (l1 = l2 → bfold_right_neList2 T1 f l1 l2 = true).
- #T; #f; #l1;
+nlemma eq_to_bfoldrightnelist2 :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(x = y → f x y = true)) →
+ (∀l1,l2:ne_list T1.
+ (l1 = l2 → bfold_right_neList2 T1 f l1 l2 = true)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
- ##[ ##1: #hh2; #H; #H1; nnormalize;
+ ##[ ##1: #hh2; #H1; nnormalize;
nrewrite > (H hh1 hh2 (nelist_destruct_nil_nil … H1));
napply refl_eq
- ##| ##2: #hh2; #ll2; #H; #H1;
+ ##| ##2: #hh2; #ll2; #H1;
(* !!! ndestruct: assert false *)
nelim (nelist_destruct_nil_cons ???? H1)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #hh2; #H1; #H2;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #hh2; #H2;
(* !!! ndestruct: assert false *)
nelim (nelist_destruct_cons_nil ???? H2)
- ##| ##2: #hh2; #ll2; #H1; #H2; nnormalize;
+ ##| ##2: #hh2; #ll2; #H2; nnormalize;
nrewrite > (nelist_destruct_cons_cons_1 … H2);
- nrewrite > (H1 hh2 hh2 (refl_eq …));
+ nrewrite > (H hh2 hh2 (refl_eq …));
nnormalize;
- nrewrite > (H ll2 H1 (nelist_destruct_cons_cons_2 … H2));
+ nrewrite > (H1 ll2 (nelist_destruct_cons_cons_2 … H2));
napply refl_eq
##]
##]
nqed.
-nlemma bfoldrightnelist2_to_lennelist
- : ∀T.∀f:T → T → bool.∀l1,l2:ne_list T.bfold_right_neList2 T f l1 l2 = true → len_neList T l1 = len_neList T l2.
+nlemma bfoldrightnelist2_to_lennelist :
+∀T.∀f:T → T → bool.
+ (∀l1,l2:ne_list T.bfold_right_neList2 T f l1 l2 = true → len_neList T l1 = len_neList T l2).
#T; #f; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
##]
nqed.
-nlemma decidable_nelist : ∀T.∀H:(Πx,y:T.decidable (x = y)).∀x,y:ne_list T.decidable (x = y).
+nlemma decidable_nelist :
+∀T.(∀x,y:T.decidable (x = y)) →
+ (∀x,y:ne_list T.decidable (x = y)).
#T; #H; #x; nelim x;
##[ ##1: #hh1; #y; ncases y;
##[ ##1: #hh2; nnormalize; napply (or2_elim (hh1 = hh2) (hh1 ≠ hh2) ? (H hh1 hh2));
##]
nqed.
-nlemma nbfoldrightnelist2_to_neq
- : ∀T1:Type.∀f:T1 → T1 → bool.∀l1,l2:ne_list T1.
- (∀x,y.(f x y = false → x ≠ y)) →
- (bfold_right_neList2 T1 f l1 l2 = false → l1 ≠ l2).
- #T; #f; #l1;
+nlemma nbfoldrightnelist2_to_neq :
+∀T1:Type.∀f:T1 → T1 → bool.
+ (∀x,y.(f x y = false → x ≠ y)) →
+ (∀l1,l2:ne_list T1.
+ (bfold_right_neList2 T1 f l1 l2 = false → l1 ≠ l2)).
+ #T; #f; #H; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
- ##[ ##1: #hh2; #H; nnormalize; #H1; #H2; napply (H hh1 hh2 H1 (nelist_destruct_nil_nil T … H2))
- ##| ##2: #hh2; #ll2; #H; #H1; nnormalize; #H2;
+ ##[ ##1: #hh2; nnormalize; #H1; #H2; napply (H hh1 hh2 H1 (nelist_destruct_nil_nil T … H2))
+ ##| ##2: #hh2; #ll2; #H1; nnormalize; #H2;
(* !!! ndestruct: assert false *)
napply (nelist_destruct_nil_cons T … H2)
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #hh2; #H1; #H2; nnormalize; #H3;
+ ##| ##2: #hh1; #ll1; #H1; #l2; ncases l2;
+ ##[ ##1: #hh2; #H2; nnormalize; #H3;
(* !!! ndestruct: assert false *)
napply (nelist_destruct_cons_nil T … H3)
- ##| ##2: #hh2; #ll2; #H1; #H2; nnormalize; #H3;
+ ##| ##2: #hh2; #ll2; #H2; nnormalize; #H3;
nchange in H2:(%) with (((f hh1 hh2)⊗(bfold_right_neList2 T f ll1 ll2)) = false);
- napply (H ll2 H1 ? (nelist_destruct_cons_cons_2 T … H3));
+ napply (H1 ll2 ? (nelist_destruct_cons_cons_2 T … H3));
napply (or2_elim ??? (andb_false2 … H2) );
##[ ##1: #H4; napply (absurd (hh1 = hh2) …);
##[ ##1: nrewrite > (nelist_destruct_cons_cons_1 T … H3); napply refl_eq
- ##| ##2: napply (H1 … H4)
+ ##| ##2: napply (H … H4)
##]
##| ##2: #H4; napply H4
##]
##]
nqed.
-nlemma nelist_destruct
- : ∀T.∀H:(Πx,y:T.decidable (x = y)).∀h1,h2:T.∀l1,l2:ne_list T.(h1§§l1) ≠ (h2§§l2) → h1 ≠ h2 ∨ l1 ≠ l2.
+nlemma nelist_destruct :
+∀T.(∀x,y:T.decidable (x = y)) →
+ (∀h1,h2:T.∀l1,l2:ne_list T.
+ (h1§§l1) ≠ (h2§§l2) → h1 ≠ h2 ∨ l1 ≠ l2).
#T; #H; #h1; #h2; #l1; nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
##[ ##1: #hh2; #H1; napply (or2_elim (h1 = h2) (h1 ≠ h2) ? (H …) …);
##]
nqed.
-nlemma neq_to_nbfoldrightnelist2
- : ∀T:Type.∀f:T → T → bool.∀l1,l2:ne_list T.
- (∀x,y:T.decidable (x = y)) →
- (∀x,y.(x ≠ y → f x y = false)) →
- (l1 ≠ l2 → bfold_right_neList2 T f l1 l2 = false).
- #T; #f; #l1;
+nlemma neq_to_nbfoldrightnelist2 :
+∀T:Type.∀f:T → T → bool.
+ (∀x,y:T.decidable (x = y)) →
+ (∀x,y.(x ≠ y → f x y = false)) →
+ (∀l1,l2:ne_list T.
+ (l1 ≠ l2 → bfold_right_neList2 T f l1 l2 = false)).
+ #T; #f; #H; #H1; #l1;
nelim l1;
##[ ##1: #hh1; #l2; ncases l2;
- ##[ ##1: #hh2; #H; #H1; nnormalize; #H2; napply (H1 hh1 hh2 ?);
+ ##[ ##1: #hh2; nnormalize; #H2; napply (H1 hh1 hh2 ?);
nnormalize; #H3; nrewrite > H3 in H2:(%); #H2; napply (H2 (refl_eq …))
- ##| ##2: #hh2; #ll2; #H; nnormalize; #H1; #H2; napply refl_eq
+ ##| ##2: #hh2; #ll2; nnormalize; #H2; napply refl_eq
##]
- ##| ##2: #hh1; #ll1; #H; #l2; ncases l2;
- ##[ ##1: #hh2; #H1; #H2; nnormalize; #H3; napply refl_eq
- ##| ##2: #hh2; #ll2; #H1; #H2; #H3;
+ ##| ##2: #hh1; #ll1; #H2; #l2; ncases l2;
+ ##[ ##1: #hh2; nnormalize; #H3; napply refl_eq
+ ##| ##2: #hh2; #ll2; #H3;
nchange with (((f hh1 hh2)⊗(bfold_right_neList2 T f ll1 ll2)) = false);
- napply (or2_elim (hh1 ≠ hh2) (ll1 ≠ ll2) ? (nelist_destruct T H1 … H3) …);
- ##[ ##1: #H4; nrewrite > (H2 hh1 hh2 H4); nnormalize; napply refl_eq
- ##| ##2: #H4; nrewrite > (H ll2 H1 H2 H4);
+ napply (or2_elim (hh1 ≠ hh2) (ll1 ≠ ll2) ? (nelist_destruct T H … H3) …);
+ ##[ ##1: #H4; nrewrite > (H1 hh1 hh2 H4); nnormalize; napply refl_eq
+ ##| ##2: #H4; nrewrite > (H2 ll2 H4);
nrewrite > (symmetric_andbool (f hh1 hh2) false);
nnormalize; napply refl_eq
##]