X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2Fsoftware%2Fcomponents%2Fng_refiner%2Fesempio.ma;h=8f9604a8524817acdbc1489a7613b43239981310;hb=d35aca0e979a9c7edbc60c44040360d52be8ca82;hp=e686e7eeef38c1669e74fe4b415de82c36091f8d;hpb=de016fec107170e4eb692b41c36a88cdc805b60a;p=helm.git diff --git a/helm/software/components/ng_refiner/esempio.ma b/helm/software/components/ng_refiner/esempio.ma index e686e7eee..8f9604a85 100644 --- a/helm/software/components/ng_refiner/esempio.ma +++ b/helm/software/components/ng_refiner/esempio.ma @@ -15,9 +15,57 @@ include "nat/plus.ma". definition hole : ∀A:Type.A → A ≝ λA.λx.x. +definition id : ∀A:Type.A → A ≝ λA.λx.x. +(* Common case in dama, reduction with metas +inductive list : Type := nil : list | cons : nat -> list -> list. +let rec len l := match l with [ nil => O | cons _ l => S (len l) ]. +axiom lt : nat -> nat -> Prop. +axiom foo : ∀x. Not (lt (hole ? x) (hole ? O)) = (lt x (len nil) -> False). +*) + +(* meta1 Vs meta2 with different contexts +axiom foo: + ∀P:Type.∀f:P→P→Prop.∀x:P. + (λw. ((∀e:P.f x (w x)) = (∀y:P. f x (hole ? y)))) + (λw:P.hole ? w). +*) + +(* meta1 Vs meta1 with different local contexts +axiom foo: + ∀P:Type.∀f:P→P→P.∀x,y:P. + (λw.(f x (w x) = f x (w y))) (λw:P.hole ? w). +*) + +(* meta Vs term && term Vs meta with different local ctx +axiom foo: + ∀P:Type.∀f:P→P→P.∀x,y:P. + (λw.(f (w x) (hole ? x) = f x (w y))) (λw:P.hole ? w). +*) + +(* occur check +axiom foo: + ∀P:Type.∀f:P→P→P.∀x,y:P. + (λw.(f x (f (w x) x) = f x (w y))) (λw:P.hole ? w). +*) + +(* unifying the type of (y ?) with (Q x) we instantiate ? to x +axiom foo: + ∀P:Type.∀Q:P→Type.∀f:∀x:P.Q x→P→P.∀x:P.∀y:∀x.Q x. + (λw.(f w (y w) x = (id ? f) x (hole ? (y x)) x)) (hole ? x). +*) + +alias num (instance 0) = "natural number". +axiom foo: (100+111) = (100+110). + + + (id ?(id ?(id ?(id ? (100+100))))) = + (id ?(id ?(id ?(id ? (99+100))))).[3: + apply (refl_eq nat (id ?(id ?(id ?(id ? (98+102+?)))))); + +axiom foo: (λx,y.(λz. z (x+y) + z x) (λw:nat.hole ? w)) = λx,y.x. (* OK *) axiom foo: (λx,y.(λz. z x + z (x+y)) (λw:nat.hole ? w)) = λx,y.x. (* KO, delift rels only *) -axiom foo: (λx,y.(λz. z (x+y) + z x) (λw:nat.hole ? w)) = λx,y.x. (* OK *) + axiom foo: (λx,y.(λz. z x + z y) (λw:nat.hole ? w)) = λx,y.x. (* OK *)