Extremal graphs for disjoint union of vertex-critical graphs

Abstract

For a graph F, let EX(n,F) be the set of F-free graphs of order n with the maximum number of edges. The graph F is called vertex-critical, if the deletion of its some vertex induces a graph with smaller chromatic number. For example, an odd wheel (obtained by connecting a vertex to a cycle of even length) is a vertex-critical graph with chromatic number 3. For h≥2, let F1,F2,...,Fh be vertex-critical graphs with the same chromatic number. Let 1≤ i≤ hFi be the disjoint union of them. In this paper, we characterize the graphs in EX(n,1≤ i≤ hFi), when there is a proper order among the graphs F1,F2,...,Fh. This solves a conjecture (on extremal problem for disjoint union of odd wheels) proposed by Xiao and Zamora XZ.

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