Partition functions and a generalized coloring-flow duality for embedded graphs
Abstract
Let be a finite group and a class function. Let be a directed graph with for each vertex a cyclic order of the edges incident to it. The cyclic orders give a collection of faces of . Define the partition function , where denotes the product of the -values of the edges incident with (in order), where the inverse is taken for any edge leaving . Write , where the sum runs over irreducible representations of with character and with for every . If is connected, it is proved that , where is the identity element of . Among the corollaries, a formula for the number of nowhere-identity -flows on is derived, generalizing a result of Tutte. We show that these flows correspond bijectively to certain proper -colorings of a covering graph of the dual graph of . This correspondence generalizes coloring-flow duality for planar graphs.
Keywords
Cite
@article{arxiv.1701.00420,
title = {Partition functions and a generalized coloring-flow duality for embedded graphs},
author = {Bart Litjens and Bart Sevenster},
journal= {arXiv preprint arXiv:1701.00420},
year = {2018}
}
Comments
Based on comments of the referees, some revisions have been made. 13 pages. To appear in Journal of Graph Theory