Disjoint Paths in Graphs III, Characterization
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Abstract.Let G be a graph, $ \{a, b, c\}\subseteq V(G) $, and
$ \{a', b', c'\}\subseteq V(G) $ such that $ \{a, b, c\}\neq \{a', b', c'\} $. We say that
$ (G, \{a, c\}, \{a', c'\}, (b, b')) $ is an obstruction if, for
any three vertex disjoint paths from {a, b, c} to
{a', b', c'} in G, one path is
from b to b'. In this paper
we characterize obstructions. As a consequence, we show that no obstruction can be 8-connected,
unless b = b' or {a, c} = {a', c'}.
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