The order of monochromatic subgraphs with a given minimum degree

Abstract

Let G be a graph. For a given positive integer d, let fG(d) denote the largest integer t such that in every coloring of the edges of G with two colors there is a monochromatic subgraph with minimum degree at least d and order at least t. For n > k > d let f(n,k,d) denote the minimum of fG(d) where G ranges over all graphs with n vertices and minimum degree at least k. In this paper we establish f(n,k,d) whenever k or n-k are fixed, and n is sufficiently large. We also consider the case where more than two colors are allowed.

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