Gallai-Ramsey Numbers for -Connected Graphs
Abstract
Given a nonempty graph G, a collection of nonempty graphs H, and a positive integer k, the Gallai-Ramsey number grk(G:H) is defined to be the minimum positive integer n such that every exact k-edge-coloring of a complete graph Kn contains either a rainbow copy of G or a monochromatic copy of some element in H. In this paper, we obtain some exact values and general lower and upper bounds for grk(G:F), where F is the set of -connected graphs and G∈\P5, K1,3\.
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