English

Counting Flows of $b$-compatible Graphs

Combinatorics 2024-09-17 v1

Abstract

Kochol introduced the assigning polynomial F(G,α;k)F(G,\alpha;k) to count nowhere-zero (A,b)(A,b)-flows of a graph GG, where AA is a finite Abelian group and α\alpha is a {0,1}\{0,1\}-assigning from a family Λ(G)\Lambda(G) of certain nonempty vertex subsets of GG to {0,1}\{0,1\}. We introduce the concepts of bb-compatible graph and bb-compatible broken bond to give an explicit formula for the assigning polynomials and to examine their coefficients. More specifically, for a function b:V(G)Ab:V(G)\to A, let αG,b\alpha_{G,b} be a {0,1}\{0,1\}-assigning of GG such that for each XΛ(G)X\in\Lambda(G), αG,b(X)=0\alpha_{G,b}(X)=0 if and only if vXb(v)=0\sum_{v\in X}b(v)=0. We show that for any {0,1}\{0,1\}-assigning α\alpha of GG, if there exists a function b:V(G)Ab:V(G)\to A such that GG is bb-compatible and α=αG,b\alpha=\alpha_{G,b}, then the assigning polynomial F(G,α;k)F(G,\alpha;k) has the bb-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 F(G,α;k)=i=0m(G)(1)iai(G,α)km(G)iF(G,\alpha;k)=\sum_{i=0}^{m(G)}(-1)^ia_i(G,\alpha)k^{m(G)-i}, where each ai(G,α)a_i(G,\alpha) is the number of subsets SS of E(G)E(G) having ii edges such that GSG-S is bb-compatible and SS contains no bb-compatible broken bonds with respect to a total order on E(G)E(G). Applying the counting interpretation, we also obtain unified comparison relations for the signless coefficients of assigning polynomials. Namely, for any {0,1}\{0,1\}-assignings α,α\alpha,\alpha' of GG, if there exist functions b:V(G)Ab:V(G)\to A and b:V(G)Ab':V(G)\to A' such that GG is both bb-compatible and bb'-compatible, α=αG,b\alpha=\alpha_{G,b}, α=αG,b\alpha'=\alpha_{G,b'} and α(X)α(X)\alpha(X)\le\alpha'(X) for all XΛ(G)X\in\Lambda(G), then ai(G,α)ai(G,α)\mboxfori=0,1,,m(G). a_i(G,\alpha)\le a_i(G,\alpha') \quad \mbox{ for }\quad i=0,1,\ldots, m(G).

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

R2 v1 2026-06-28T18:45:02.136Z