A note about monochromatic components in graphs of large minimum degree

Abstract

For all positive integers r≥ 3 and n such that r2-r divides n and an affine plane of order r exists, we construct an r-edge colored graph with minimum degree (1-r-2r2-r)n-2 such that the largest monochromatic component has order less than nr-1. This generalizes an example of Guggiari and Scott and, independently, Rahimi for r=3 and thus disproves a conjecture of Gy\'arf\'as and S\'ark\"ozy for all integers r≥ 3 such that an affine plane of order r exists.