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Quellcode-Bibliothek
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Datei: MExtraction.v Sprache: Coq
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Untersuchungsergebnis.out Download desHaskell {Haskell[224] Ada[401] Abap[468]}zum Wurzelverzeichnis wechseln Nat.sub : nat -> nat -> nat Nat.sub is not universe polymorphic Argument scopes are [nat_scope nat_scope] The reduction tactics unfold Nat.sub but avoid exposing match constructs Nat.sub is transparent Expands to: Constant Coq.Init.Nat.sub Nat.sub : nat -> nat -> nat Nat.sub is not universe polymorphic Argument scopes are [nat_scope nat_scope] The reduction tactics unfold Nat.sub when applied to 1 argument but avoid exposing match constructs Nat.sub is transparent Expands to: Constant Coq.Init.Nat.sub Nat.sub : nat -> nat -> nat Nat.sub is not universe polymorphic Argument scopes are [nat_scope nat_scope] The reduction tactics unfold Nat.sub when the 1st argument evaluates to a constructor and when applied to 1 argument but avoid exposing match constructs Nat.sub is transparent Expands to: Constant Coq.Init.Nat.sub Nat.sub : nat -> nat -> nat Nat.sub is not universe polymorphic Argument scopes are [nat_scope nat_scope] The reduction tactics unfold Nat.sub when the 1st and 2nd arguments evaluate to a constructor and when applied to 2 arguments Nat.sub is transparent Expands to: Constant Coq.Init.Nat.sub Nat.sub : nat -> nat -> nat Nat.sub is not universe polymorphic Argument scopes are [nat_scope nat_scope] The reduction tactics unfold Nat.sub when the 1st and 2nd arguments evaluate to a constructor Nat.sub is transparent Expands to: Constant Coq.Init.Nat.sub pf : forall D1 C1 : Type, (D1 -> C1) -> forall D2 C2 : Type, (D2 -> C2) -> D1 * D2 -> C1 * C2 pf is not universe polymorphic Arguments D2, C2 are implicit Arguments D1, C1 are implicit and maximally inserted Argument scopes are [foo_scope type_scope _ _ _ _ _] The reduction tactics never unfold pf pf is transparent Expands to: Constant Arguments.pf fcomp : forall A B C : Type, (B -> C) -> (A -> B) -> A -> C fcomp is not universe polymorphic Arguments A, B, C are implicit and maximally inserted Argument scopes are [type_scope type_scope type_scope _ _ _] The reduction tactics unfold fcomp when applied to 6 arguments fcomp is transparent Expands to: Constant Arguments.fcomp volatile : nat -> nat volatile is not universe polymorphic Argument scope is [nat_scope] The reduction tactics always unfold volatile volatile is transparent Expands to: Constant Arguments.volatile f : T1 -> T2 -> nat -> unit -> nat -> nat f is not universe polymorphic Argument scopes are [_ _ nat_scope _ nat_scope] f is transparent Expands to: Constant Arguments.S1.S2.f f : T1 -> T2 -> nat -> unit -> nat -> nat f is not universe polymorphic Argument scopes are [_ _ nat_scope _ nat_scope] The reduction tactics unfold f when the 3rd, 4th and 5th arguments evaluate to a constructor f is transparent Expands to: Constant Arguments.S1.S2.f f : forall T2 : Type, T1 -> T2 -> nat -> unit -> nat -> nat f is not universe polymorphic Argument T2 is implicit Argument scopes are [type_scope _ _ nat_scope _ nat_scope] The reduction tactics unfold f when the 4th, 5th and 6th arguments evaluate to a constructor f is transparent Expands to: Constant Arguments.S1.f f : forall T1 T2 : Type, T1 -> T2 -> nat -> unit -> nat -> nat f is not universe polymorphic Arguments T1, T2 are implicit Argument scopes are [type_scope type_scope _ _ nat_scope _ nat_scope] The reduction tactics unfold f when the 5th, 6th and 7th arguments evaluate to a constructor f is transparent Expands to: Constant Arguments.f = forall v : unit, f 0 0 5 v 3 = 2 : Prop = 2 = 2 : Prop f : forall T1 T2 : Type, T1 -> T2 -> nat -> unit -> nat -> nat f is not universe polymorphic The reduction tactics unfold f when the 5th, 6th and 7th arguments evaluate to a constructor f is transparent Expands to: Constant Arguments.f forall w : r, w 3 true = tt : Prop The command has indeed failed with message: Unknown interpretation for notation "$". w 3 true = tt : Prop The command has indeed failed with message: Extra arguments: _, _. [ zur Elbe Produktseite wechseln0.113Quellennavigators ] |