On Degree Sum Conditions and Vertex-Disjoint Chorded Cycles
Abstract
In this paper, we consider a general degree sum condition sufficient to imply the existence of k vertex-disjoint chorded cycles in a graph G. Let σt(G) be the minimum degree sum of t independent vertices of G. We prove that if G is a graph of sufficiently large order and σt(G)≥ 3kt-t+1 with k≥ 1, then G contains k vertex-disjoint chorded cycles. We also show that the degree sum condition on σt(G) is sharp. To do this, we also investigate graphs without chorded cycles.
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