Graph Polynomials and Group Coloring of Graphs
Combinatorics
2023-12-05 v2
Abstract
Let be an Abelian group and let be a simple graph. We say that is -colorable if for some fixed orientation of and every edge labeling , there exists a vertex coloring by the elements of such that , for every edge (oriented from to ). Langhede and Thomassen proved recently that every planar graph on vertices has at least different -colorings. By using a different approach based on graph polynomials, we extend this result to -minor-free graphs in the more general setting of field coloring. More specifically, we prove that every such graph on vertices is --choosable, whenever is an arbitrary field with at least elements. Moreover, the number of colorings (for every list assignment) is at least .
Cite
@article{arxiv.2012.03230,
title = {Graph Polynomials and Group Coloring of Graphs},
author = {Bartłomiej Bosek and Jarosław Grytczuk and Grzegorz Gutowski and Oriol Serra and Mariusz Zając},
journal= {arXiv preprint arXiv:2012.03230},
year = {2023}
}
Comments
14 pages