sep_num_gt_0: LEMMA vert(G)(s) AND vert(G)(t) AND separable?(G,s,t) AND sep_num(G,s,t) > 0 IMPLIES
(EXISTS (w: prewalk): walk_from?(G,w,s,t))
sep_num_is_1: LEMMA vert(G)(s) AND vert(G)(t) AND v /= s AND v /= t AND
(FORALL (p: prewalk): walk_from?(G,p,s,t) IMPLIES
(EXISTS (i: below(length(p))): seq(p)(i) = v)) IMPLIES sep_num(G,s,t) <= 1
av: VAR T
sep_num_le1: LEMMA vert(G)(s) AND vert(G)(t) AND vert(G)(av) AND
av /= s AND av /= t AND
separable?(G, s, t) AND
sep_num(G,s,t) <= 1 IMPLIES
(EXISTS (z: T): vert(G)(z) AND z /= s AND z /= t AND
separates(G,singleton(z),s,t))
k: VAR nat
path_thru_each: LEMMA sep_num(G,s,t) = k AND separates(G, W, s, t) AND card(W) = k AND W(v) AND vert(G)(s) AND vert(G)(t) IMPLIES
(EXISTS (pv: prewalk): verts_of(pv)(v) AND path_from?(G,pv,s,t))
one_to_each: LEMMA sep_num(G,s,t) = 2 AND separates(G, dbl(w1, w2), s, t) AND vert(G)(s) AND vert(G)(t) IMPLIES
( (EXISTS (Psw1: prewalk): path_from?(G, Psw1, s, w1)) AND
(EXISTS (Psw2: prewalk): path_from?(G, Psw2, s, w2)))
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