| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/PVS/graphs/ (Beweissystem der NASA Version 6.0.9©) Datei vom 28.9.2014 mit Größe 1 kB |
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Quelle graph_path_conn.pvs Sprache: PVS |
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graph_path_conn[T: TYPE]: THEORY
BEGIN IMPORTING graph_conn_defs[T], walks[T], subgraphs[T] G,G1,G2: VAR graph[T] isolated_not_path: LEMMA isolated?(G) AND NOT singleton?(G) IMPLIES NOT path_connected?(G) u,v,y: VAR T pic_A: LEMMA (EXISTS v: vert(G)(v) AND deg(v,G) = 0) IMPLIES path_connected?(G) IMPLIES connected?(G) IMPORTING graph_inductions[T], subtrees[T], path_ops[T] thw_A: LEMMA (FORALL (GG: graph[T]): size(GG) < size(G) IMPLIES (FORALL (x: T, y: T): tree?(GG) AND vert(GG)(x) AND vert(GG)(y) AND x /= y IMPLIES (EXISTS (w: Walk(GG)): walk_from?(GG, w, x, y)))) AND deg(v, G) = 1 AND tree?(del_vert[T](G, v)) AND vert(G)(v) AND vert(G)(y) AND v /= y IMPLIES (EXISTS (w: Walk(G)): walk_from?(G, w, v, y)) TR: VAR graph[T] x: VAR T tree_has_walk: LEMMA tree?(TR) AND vert(TR)(x) AND vert(TR)(y) AND x /= y IMPLIES (EXISTS (w: Walk(TR)): walk_from?(TR,w,x,y)) path_implies_conn: THEOREM path_connected?(G) IMPLIES connected?(G) END graph_path_conn ¤ Dauer der Verarbeitung: 0.14 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28