Minimum degree condition for a graph to be knitted
Abstract
For a positive integer k, a graph is k-knitted if for each k-subset S of vertices, and every partition of S into disjoint parts S1, …, St for some t 1, one can find disjoint connected subgraphs C1, …, Ct such that Ci contains Si for each i. In this article, we show that if the minimum degree of an n-vertex graph G is at least n/2+k/2-1 when n 2k+3, then G is k-knitted. The minimum degree is sharp. As a corollary, we obtain that k-contraction-critical graphs are k8-connected.
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