An algebraic reduction of Hedetniemi's conjecture
Abstract
For a graph G, let (G) denote the chromatic number. In graph theory, the following famous conjecture posed by Hedetniemi has been studied: For two graphs G and H, (G× H)=\ (G), (H)\, where G × H is the tensor product of G and H. In this paper, we give a reduction of Hedetniemi's conjecture to an inclusion relation problem on ideals of polynomial rings, and we demonstrate computational experiments for partial solutions of Hedetniemi's conjecture along such a strategy using Gr\"obner basis.
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