The packing chromatic number of the square lattice is at least 12

Abstract

The packing chromatic number (G) of a graph G is the smallest integer k such that the vertex set V(G) can be partitioned into disjoint classes X1, ..., Xk, where vertices in Xi have pairwise distance greater than i. For the 2-dimensional square lattice Z2 it is proved that (Z2) ≥ 12, which improves the previously known lower bound 10.