Between proper and square coloring of planar graphs, hardness and extremal graphs

Abstract

(1a, 2b)-coloring is the problem of partitioning the vertex set of a graph into a independent sets and b 2-independent sets. This problem was recently introduced by Choi and Liu. We study the computational complexity and extremal properties of (1a, 2b)-coloring. We prove that this problem is NP-Complete even when restricted to certain classes of planar graphs, and we also investigate the extremal values of b when a is fixed and in some (a + 1)-colorable classes of graphs. In particular, we prove that k-degenerate graphs are (1k, 2O(n))-colorable, that triangle-free planar graphs are (12, 2O(n))-colorable and that planar graphs are (13, 2O(n))-colorable. All upper bounds obtained are tight up to a constant factor.