4-Chromatic Graphs Have At Least 4 Cycles of Length 0 3

Abstract

A 2018 conjecture of Brewster, McGuinness, Moore, and Noel asserts that for k 3, if a graph has chromatic number greater than k, then it contains at least as many cycles of length 0 k as the complete graph on k+1 vertices. Our main result confirms this in the k=3 case by showing every 4-critical graph contains at least 4 cycles of length 0 3, and that K4 is the unique such graph achieving the minimum. We make progress on the general conjecture as well, showing that (k+1)-critical graphs with minimum degree k have at least as many cycles of length 0 r as Kk+1, provided k+1 0 r. We also show that Kk+1 uniquely minimizes the number of cycles of length 1 k among all (k+1)-critical graphs, strengthening a recent result of Moore and West and extending it to the k=3 case.

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