Counting Flows of $b$-compatible Graphs
Abstract
Kochol introduced the assigning polynomial to count nowhere-zero -flows of a graph , where is a finite Abelian group and is a -assigning from a family of certain nonempty vertex subsets of to . We introduce the concepts of -compatible graph and -compatible broken bond to give an explicit formula for the assigning polynomials and to examine their coefficients. More specifically, for a function , let be a -assigning of such that for each , if and only if . We show that for any -assigning of , if there exists a function such that is -compatible and , then the assigning polynomial has the -compatible spanning subgraph expansion F(G,\alpha;k)=\sum_{\substack{S\subseteq E(G),\\G-S\mbox{ is $b$-compatible}}}(-1)^{|S|}k^{m(G-S)}, and is the following form , where each is the number of subsets of having edges such that is -compatible and contains no -compatible broken bonds with respect to a total order on . Applying the counting interpretation, we also obtain unified comparison relations for the signless coefficients of assigning polynomials. Namely, for any -assignings of , if there exist functions and such that is both -compatible and -compatible, , and for all , then
Keywords
Cite
@article{arxiv.2409.09634,
title = {Counting Flows of $b$-compatible Graphs},
author = {Houshan Fu and Xiangyu Ren and Suijie Wang},
journal= {arXiv preprint arXiv:2409.09634},
year = {2024}
}
Comments
12pages