Fractional coloring via entropy

Abstract

In recent work, Martinsson and Steiner showed that every K3-free d-degenerate graph G has fractional chromatic number f(G) = O(d d). In this paper, we extend the result in two ways, employing an approach rooted in the analysis of the entropy of certain probability distributions. Our argument provides a template to tackle other problems, so it is of independent interest. First, we consider locally r-colorable graphs G, i.e., where (G[N(v)]) ≤ r for each vertex v. We show that d-degenerate locally r-colorable graphs G satisfy f(G) = O(d (2r) d), strengthening a result of Alon (1996) on the independence number of such graphs. Second, we extend Martinsson and Steiner's result to r-uniform d-degenerate hypergraphs H of girth at least 4. We show that such hypergraphs satisfy f(H) ≤ cr(d d)1r-1, implying a strict generalization of a seminal result of Ajtai, Koml\'os, Pintz, Spencer, and Szemer\'edi (1982) on the independence number of uncrowded hypergraphs. As a corollary, we obtain the same growth rate for the fractional chromatic number of d-degenerate linear hypergraphs. Our approach is constructive, yielding efficient algorithms to sample independent sets in each of the settings we consider.

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