The fractional chromatic number of the direct product of graphs

Xuding Zhu

doi:10.1017/S0017089502010066

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This paper discusses the fractional chromatic number of the direct product of graphs. It is proved that if H is a circulant graph G^k_d, or a Kneser graph, or a direct sum of such graphs, then for any graph G, \chi_f{\hskip1}(G\times H{\hskip1}) = {\text min}\{\chi_f{\hskip1}(G), \chi_f{\hskip1}(H{\hskip1})\}.

Crossref Citations

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The fractional chromatic number of the direct product of graphs

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