| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/PVS/structures/ (Beweissystem der NASA Version 6.0.9©) Datei vom 28.9.2014 mit Größe 2 kB |
|
Quelle fseqs_ops.pvs Sprache: PVS |
|||||||||
|
fseqs_ops [T: TYPE+]: THEORY
%------------------------------------------------------------------------ % % Defines some convenient operations over finite sequences % % EXPERIMENTAL % %------------------------------------------------------------------------ BEGIN IMPORTING fseqs[T] fs: VAR fseq nefs: VAR ne_fseq i,n: VAR nat x: VAR T first(fs): T = fs`seq(0) rest(fs): fseq = fs^(1,l(fs)) delete(n, nefs): fseq = IF n < l(nefs) THEN (# length := l(nefs) - 1, seq := (LAMBDA i: (IF i < n THEN nefs(i) ELSE nefs(i + 1) ENDIF)) #) ELSE nefs ENDIF insert(x, n, fs): fseq = IF n <= l(fs) THEN (# length := l(fs) + 1, seq := (LAMBDA i: IF i < n THEN fs(i) ELSIF i = n THEN x ELSE fs(i - 1) ENDIF) #) ELSE fs ENDIF add(x, fs): fseq = insert(x, 0, fs) addend(x:T,fs:fseq): fseq = (# length := l(fs) + 1, seq := (LAMBDA (ii: nat): IF ii < l(fs) THEN seq(fs)(ii) ELSIF ii < l(fs) + 1 THEN x ELSE default ENDIF) #) insert_delete: LEMMA n < l(nefs) IMPLIES insert(nefs`seq(n), n, delete(n, nefs)) = nefs add_first_rest: LEMMA add(first(nefs), rest(nefs)) = nefs p: VAR pred[T] every(p)(fs): bool = (FORALL n: n < l(fs) IMPLIES p(fs(n))) every(p, fs): bool = (FORALL n: n < l(fs) IMPLIES p(fs(n))) some(p)(fs): bool = (EXISTS n: n < l(fs) IMPLIES p(fs(n))) some(p, fs): bool = (EXISTS n: n < l(fs) IMPLIES p(fs(n))) % This definition looks a little strange. The following lemma can be easily proved. some_p_trivial: LEMMA some(p,fs) F: VAR [T -> T] map(F,fs): fseq = (# length := length(fs), seq := (LAMBDA i: IF i < length(fs) THEN F(fs`seq(i)) ELSE default ENDIF) #) END fseqs_ops ¤ Dauer der Verarbeitung: 0.11 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
|
2026-03-28