Coloring the square of the Cartesian product of two cycles

Abstract

The square G2 of a graph G is defined on the vertex set of G in such a way that distinct vertices with distance at most two in G are joined by an edge. We study the chromatic number of the square of the Cartesian product Cm Cn of two cycles and show that the value of this parameter is at most 7 except when m=n=3, in which case the value is 9, and when m=n=4 or m=3 and n=5, in which case the value is 8. Moreover, we conjecture that whenever G=Cm Cn, the chromatic number of G2 equals mn/α(G2) , where α(G2) denotes the size of a maximal independent set in G2.