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Quellcode-Bibliothek
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Datei: find_theorems.ML Sprache: SML
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Untersuchungsergebnis.out Download desLatech {Latech[59] Haskell[197] Abap[225]}zum Wurzelverzeichnis wechseln [< 0 > + < 1 > * < 2 >] : nat Entry constr:myconstr is [ "6" RIGHTA [ ] | "5" RIGHTA [ SELF; "+"; NEXT ] | "4" RIGHTA [ SELF; "*"; NEXT ] | "3" RIGHTA [ "<"; constr:operconstr LEVEL "10"; ">" ] ] [< b > + < b > * < 2 >] : nat [<< # 0 >>] : option nat [1 {f 1}] : Expr fun (x : nat) (y z : Expr) => [1 + y z + {f x}] : nat -> Expr -> Expr -> Expr fun e : Expr => match e with | [x y + z] => [x + y z] | [1 + 1] => [1] | _ => [e + e] end : Expr -> Expr [(1 + 1)] : Expr Let "x" e1 e2 : expr Let "x" e1 e2 : expr myAnd1 True True : Prop r 2 3 : Prop let v := 0%test17 in v : myint63 : myint63 fun y : nat => # (x, z) |-> y & y : forall y : nat, (?T1 * ?T2 -> ?T1 * ?T2 * nat) * (?T * ?T0 -> ?T * ?T0 * nat) where ?T : [y : nat pat : ?T * ?T0 p0 : ?T * ?T0 p := p0 : ?T * ?T0 |- Type] (pat, p0, p cannot be used) ?T0 : [y : nat pat : ?T * ?T0 p0 : ?T * ?T0 p := p0 : ?T * ?T0 |- Type] (pat, p0, p cannot be used) ?T1 : [y : nat pat : ?T1 * ?T2 p0 : ?T1 * ?T2 p := p0 : ?T1 * ?T2 |- Type] (pat, p0, p cannot be used) ?T2 : [y : nat pat : ?T1 * ?T2 p0 : ?T1 * ?T2 p := p0 : ?T1 * ?T2 |- Type] (pat, p0, p cannot be used) fun y : nat => # (x, z) |-> (x + y) & (y + z) : forall y : nat, (nat * ?T -> nat * ?T * nat) * (?T0 * nat -> ?T0 * nat * nat) where ?T : [y : nat pat : nat * ?T p0 : nat * ?T p := p0 : nat * ?T |- Type] (pat, p0, p cannot be used) ?T0 : [y : nat pat : ?T0 * nat p0 : ?T0 * nat p := p0 : ?T0 * nat |- Type] (pat, p0, p cannot be used) [ zur Elbe Produktseite wechseln0.102Quellennavigators ] |