Odd-Sum Colorings of Planar Graphs

Abstract

A coloring of a graph G is a map f:V(G) Z+ such that f(v) f(w) for all vw∈ E(G). A coloring f is an odd-sum coloring if Σw∈ N[v]f(w) is odd, for each vertex v∈ V(G). The odd-sum chromatic number of a graph G, denoted os(G), is the minimum number of colors used (that is, the minimum size of the range) in an odd-sum coloring of G. Caro, Petrusevski, and Skrekovski showed, among other results, that os(G) is well-defined for every finite graph G and, in fact, os(G) 2(G). Thus, os(G) 8 for every planar graph G (by the 4 Color Theorem), os(G) 6 for every triangle-free planar graph G (by Gr\"otzsch's Theorem), and os(G) 4 for every bipartite graph. Caro et al. asked, for every even 4, whether there exists g such that if G is planar with maximum degree and girth at least g then os(G) 5. They also asked, for every even 4, whether there exists g such that if G is planar and bipartite with maximum degree and girth at least g then os(G) 3. We answer both questions negatively. We also refute a conjecture they made, resolve one further problem they posed, and make progress on another.