Relaxation of Wegner's Planar Graph Conjecture for maximum degree 4

Abstract

The famous Wegner's Planar Graph Conjecture asserts tight upper bounds on the chromatic number of the square G2 of a planar graph G, depending on the maximum degree (G) of G. The only case that the conjecture is resolved is when (G)=3, which was proven to be true by Thomassen, and independently by Hartke, Jahanbekam, and Thomas. For (G)=4, Wegner's Planar Graph Conjecture states that the chromatic number of G2 is at most 9; even this case is still widely open, and very recently Bousquet, de Meyer, Deschamps, and Pierron claimed an upper bound of 12. We take a completely different approach, and show that a relaxation of properly coloring the square of a planar graph G with (G)=4 can be achieved with 9 colors. Instead of requiring every color in the neighborhood of a vertex to be unique, which is equivalent to a proper coloring of G2, we seek a proper coloring of G such that at most one color is allowed to be repeated in the neighborhood of a vertex of degree 4, but nowhere else.

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