Graph Polynomials and Group Coloring of Graphs

Abstract

Let be an Abelian group and let G be a simple graph. We say that G is -colorable if for some fixed orientation of G and every edge labeling :E(G)→ , there exists a vertex coloring c by the elements of such that c(y)-c(x)≠ (e), for every edge e=xy (oriented from x to y). Langhede and Thomassen proved recently that every planar graph on n vertices has at least 2n/9 different Z5-colorings. By using a different approach based on graph polynomials, we extend this result to K5-minor-free graphs in the more general setting of field coloring. More specifically, we prove that every such graph on n vertices is F-5-choosable, whenever F is an arbitrary field with at least 5 elements. Moreover, the number of colorings (for every list assignment) is at least 5n/4.