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Quellcode-Bibliothek© Kompilation durch diese Firma[Weder Korrektheit noch Funktionsfähigkeit der Software werden zugesichert.]Datei: subseq.prf Sprache: LispOriginal von: PVS© |
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(subseq (subseq_index 0
(subseq_index-1 nil 3398148619 ("" (skolem + ("f" "_")) (("" (typepred "f") (("" (expand "strict_increasing?") (("" (induct "i") (("1" (assert) nil nil) ("2" (skosimp) (("2" (inst - "j!1" "j!1+1") (("2" (assert) nil nil)) nil)) nil)) nil)) nil)) nil)) nil) ((strict_increasing? const-decl "bool" real_fun_preds "reals/") (nat nonempty-type-eq-decl nil naturalnumbers nil) (>= const-decl "bool" reals nil) (int nonempty-type-eq-decl nil integers nil) (integer_pred const-decl "[rational -> boolean]" integers nil) (rational nonempty-type-from-decl nil rationals nil) (rational_pred const-decl "[real -> boolean]" rationals nil) (real nonempty-type-from-decl nil reals nil) (real_pred const-decl "[number_field -> boolean]" reals nil) (number_field nonempty-type-from-decl nil number_fields nil) (number_field_pred const-decl "[number -> boolean]" number_fields nil) (number nonempty-type-decl nil numbers nil) (NOT const-decl "[bool -> bool]" booleans nil) (bool nonempty-type-eq-decl nil booleans nil) (boolean nonempty-type-decl nil booleans nil) (pred type-eq-decl nil defined_types nil) (nat_induction formula-decl nil naturalnumbers nil) (real_ge_is_total_order name-judgement "(total_order?[real])" real_props nil) (nnint_plus_posint_is_posint application-judgement "posint" integers nil) (+ const-decl "[numfield, numfield -> numfield]" number_fields nil) (numfield nonempty-type-eq-decl nil number_fields nil) (real_lt_is_strict_total_order name-judgement "(strict_total_order?[real])" real_props nil)) shostak)) (reflexive_subseq 0 (reflexive_subseq-1 nil 3398150273 ("" (skosimp) (("" (expand "subseq?") (("" (inst + "lambda i:i") (("1" (skosimp) nil nil) ("2" (expand "strict_increasing?") (("2" (skosimp) nil nil)) nil)) nil)) nil)) nil) ((subseq? const-decl "bool" subseq nil) (number nonempty-type-decl nil numbers nil) (boolean nonempty-type-decl nil booleans nil) (number_field_pred const-decl "[number -> boolean]" number_fields nil) (number_field nonempty-type-from-decl nil number_fields nil) (real_pred const-decl "[number_field -> boolean]" reals nil) (real nonempty-type-from-decl nil reals nil) (rational_pred const-decl "[real -> boolean]" rationals nil) (rational nonempty-type-from-decl nil rationals nil) (integer_pred const-decl "[rational -> boolean]" integers nil) (int nonempty-type-eq-decl nil integers nil) (bool nonempty-type-eq-decl nil booleans nil) (>= const-decl "bool" reals nil) (nat nonempty-type-eq-decl nil naturalnumbers nil) (strict_increasing? const-decl "bool" real_fun_preds "reals/")) shostak)) (transitive_subseq 0 (transitive_subseq-1 nil 3398150181 ("" (expand "subseq?") (("" (skosimp*) (("" (inst + "f!2 o f!1") (("1" (skosimp) (("1" (inst - "i!1") (("1" (inst - "f!1(i!1)") (("1" (expand "o ") (("1" (assert) nil nil)) nil)) nil)) nil)) nil) ("2" (hide -1 -2) (("2" (typepred "f!2") (("2" (typepred "f!1") (("2" (expand "o") (("2" (expand "strict_increasing?") (("2" (skosimp) (("2" (inst - "x!1" "y!1") (("2" (inst - "f!1(x!1)" "f!1(y!1)") (("2" (assert) nil nil)) nil)) nil)) nil)) nil)) nil)) nil)) nil)) nil)) nil)) nil)) nil) ((real_lt_is_strict_total_order name-judgement "(strict_total_order?[real])" real_props nil) (NOT const-decl "[bool -> bool]" booleans nil) (number nonempty-type-decl nil numbers nil) (boolean nonempty-type-decl nil booleans nil) (number_field_pred const-decl "[number -> boolean]" number_fields nil) (number_field nonempty-type-from-decl nil number_fields nil) (real_pred const-decl "[number_field -> boolean]" reals nil) (real nonempty-type-from-decl nil reals nil) (rational_pred const-decl "[real -> boolean]" rationals nil) (rational nonempty-type-from-decl nil rationals nil) (integer_pred const-decl "[rational -> boolean]" integers nil) (int nonempty-type-eq-decl nil integers nil) (bool nonempty-type-eq-decl nil booleans nil) (>= const-decl "bool" reals nil) (nat nonempty-type-eq-decl nil naturalnumbers nil) (strict_increasing? const-decl "bool" real_fun_preds "reals/") (O const-decl "T3" function_props nil) (f!2 skolem-const-decl "({f: [nat -> nat] | strict_increasing?(f)})" subseq nil) (f!1 skolem-const-decl "({f: [nat -> nat] | strict_increasing?(f)})" subseq nil) (subseq? const-decl "bool" subseq nil)) shostak))) ¤ Dauer der Verarbeitung: 0.15 Sekunden (vorverarbeitet) ¤ |
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