X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=matita%2Fmatita%2Fcontribs%2Flambdadelta%2Flegacy_1%2Fcoq%2Ffwd.ma;h=5e19eab759ecf1f7baf246d7b39b71bc2a390e86;hb=14a8276e6d877c2281a1fda452ed3e4c150f5d39;hp=332911d0b0770c0e830134a3335e3e6fe265d51c;hpb=9c954a9a843ebb1bf189536df4e14f77132ed1cf;p=helm.git diff --git a/matita/matita/contribs/lambdadelta/legacy_1/coq/fwd.ma b/matita/matita/contribs/lambdadelta/legacy_1/coq/fwd.ma index 332911d0b..5e19eab75 100644 --- a/matita/matita/contribs/lambdadelta/legacy_1/coq/fwd.ma +++ b/matita/matita/contribs/lambdadelta/legacy_1/coq/fwd.ma @@ -31,7 +31,7 @@ theorem land_rect: P))) \to ((land A B) \to P)))) \def \lambda (A: Prop).(\lambda (B: Prop).(\lambda (P: Type[0]).(\lambda (f: ((A -\to (B \to P)))).(\lambda (a: (land A B)).(match a in land with [(conj x x0) +\to (B \to P)))).(\lambda (a: (land A B)).(match a with [(conj x x0) \Rightarrow (f x x0)]))))). theorem land_ind: @@ -45,7 +45,7 @@ theorem or_ind: (((B \to P)) \to ((or A B) \to P))))) \def \lambda (A: Prop).(\lambda (B: Prop).(\lambda (P: Prop).(\lambda (f: ((A \to -P))).(\lambda (f0: ((B \to P))).(\lambda (o: (or A B)).(match o in or with +P))).(\lambda (f0: ((B \to P))).(\lambda (o: (or A B)).(match o with [(or_introl x) \Rightarrow (f x) | (or_intror x) \Rightarrow (f0 x)])))))). theorem ex_ind: @@ -54,7 +54,7 @@ Prop).(((\forall (x: A).((P x) \to P0))) \to ((ex A P) \to P0)))) \def \lambda (A: Type[0]).(\lambda (P: ((A \to Prop))).(\lambda (P0: Prop).(\lambda (f: ((\forall (x: A).((P x) \to P0)))).(\lambda (e: (ex A -P)).(match e in ex with [(ex_intro x x0) \Rightarrow (f x x0)]))))). +P)).(match e with [(ex_intro x x0) \Rightarrow (f x x0)]))))). theorem ex2_ind: \forall (A: Type[0]).(\forall (P: ((A \to Prop))).(\forall (Q: ((A \to @@ -63,8 +63,8 @@ Prop))).(\forall (P0: Prop).(((\forall (x: A).((P x) \to ((Q x) \to P0)))) \def \lambda (A: Type[0]).(\lambda (P: ((A \to Prop))).(\lambda (Q: ((A \to Prop))).(\lambda (P0: Prop).(\lambda (f: ((\forall (x: A).((P x) \to ((Q x) -\to P0))))).(\lambda (e: (ex2 A P Q)).(match e in ex2 with [(ex_intro2 x x0 -x1) \Rightarrow (f x x0 x1)])))))). +\to P0))))).(\lambda (e: (ex2 A P Q)).(match e with [(ex_intro2 x x0 x1) +\Rightarrow (f x x0 x1)])))))). theorem eq_rect: \forall (A: Type[0]).(\forall (x: A).(\forall (P: ((A \to Type[0]))).((P x) @@ -72,7 +72,7 @@ theorem eq_rect: \def \lambda (A: Type[0]).(\lambda (x: A).(\lambda (P: ((A \to Type[0]))).(\lambda (f: (P x)).(\lambda (y: A).(\lambda (e: (eq A x -y)).(match e in eq with [refl_equal \Rightarrow f])))))). +y)).(match e with [refl_equal \Rightarrow f])))))). theorem eq_ind: \forall (A: Type[0]).(\forall (x: A).(\forall (P: ((A \to Prop))).((P x) \to @@ -83,13 +83,13 @@ x P))). let rec le_ind (n: nat) (P: (nat \to Prop)) (f: P n) (f0: (\forall (m: nat).((le n m) \to ((P m) \to (P (S m)))))) (n0: nat) (l: le n n0) on l: P n0 -\def match l in le with [le_n \Rightarrow f | (le_S m l0) \Rightarrow (let -TMP_5 \def ((le_ind n P f f0) m l0) in (f0 m l0 TMP_5))]. +\def match l with [le_n \Rightarrow f | (le_S m l0) \Rightarrow (let TMP_1 +\def ((le_ind n P f f0) m l0) in (f0 m l0 TMP_1))]. let rec Acc_ind (A: Type[0]) (R: (A \to (A \to Prop))) (P: (A \to Prop)) (f: (\forall (x: A).(((\forall (y: A).((R y x) \to (Acc A R y)))) \to (((\forall (y: A).((R y x) \to (P y)))) \to (P x))))) (a: A) (a0: Acc A R a) on a0: P a -\def match a0 in Acc with [(Acc_intro x a1) \Rightarrow (let TMP_7 \def -(\lambda (y: A).(\lambda (r: (R y x)).(let TMP_6 \def (a1 y r) in ((Acc_ind A -R P f) y TMP_6)))) in (f x a1 TMP_7))]. +\def match a0 with [(Acc_intro x a1) \Rightarrow (let TMP_2 \def (\lambda (y: +A).(\lambda (r: (R y x)).(let TMP_1 \def (a1 y r) in ((Acc_ind A R P f) y +TMP_1)))) in (f x a1 TMP_2))].