Bounding the fractional chromatic number of K-free graphs
Abstract
King, Lu, and Peng recently proved that for ≥ 4, any K-free graph with maximum degree has fractional chromatic number at most -267 unless it is isomorphic to C5 K2 or C82. Using a different approach we give improved bounds for ≥ 6 and pose several related conjectures. Our proof relies on a weighted local generalization of the fractional relaxation of Reed's ω, , conjecture.
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