paths[T: TYPE ]: THEORY BEGIN IMPORTING digraphs[T], walks[T] %%%%%MAR, seq_def VAR digraph[T]VAR TVAR natVAR prewalkAND (FORALL (i,j: below(length(ps))):IMPLIES ps(i) /= ps(j))TYPE = {p: prewalk | path?(G,p)}AND from ?(ps,s,t)TYPE = {p: prewalk | path_from?(G,p,s,t)}OR (i = length(w)-1)LEMMA path?(G,ps) IMPLIES verts_in?(G,ps)LEMMA path_from?(G,ps,s,t) AND s /= t IMPLIES length(ps) >= 2LEMMA path_from?(G, ps, s, t) IMPLIES AND vert(G)(t)LEMMA i <= j AND j < length(ps) AND path?(G,ps) IMPLIES path?(G,ps^(i,j))LEMMA i <= j AND j < length(ps) AND path_from?(G, ps, s, t)IMPLIES path_from?(G, ps^(i, j),seq(ps)(i),seq(ps)(j))%%%%%%%%%%%%%%%%%%%% NOT TRUE fpr directed graphs %%%%%%%%%%%%%%%%%%% % % path?_rev : LEMMA path?(G,ps) IMPLIES path?(G,rev(ps)) LEMMA vert(G)(x) AND vert(G)(y) AND x /= y AND IMPLIES path?(G,gen_seq2(G,x,y))LEMMA path?(G,p) AND vert(G)(x)AND edge?(G)(seq(p)(length(p)-1),x)AND NOT verts_of(p)(x)IMPLIES path?(G,add1(p,x)) LEMMA path?(G,p) AND length(p) > 1 IMPLIES END pathsquality 96%
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