Polynomials counting nowhere-zero chains in graphs
The electronic journal of combinatorics, Tome 29 (2022) no. 1
We introduce polynomials counting nowhere-zero chains in graphs – nonhomogeneous analogues of nowhere-zero flows. For a graph $G$, an Abelian group $A$, and $b:V(G)\to A$, let $\alpha_{G,b}$ be a mapping from $\Lambda(G)$ (a family of vertex sets of connected subgraphs of $G$ satisfying an additional condition) to $\{0,1\}$ such that for each $X\in\Lambda(G)$, $\alpha_{G,b}(X)=0$ if and only if $\sum_{v\in X}b(v)=0$. We prove that there exists a polynomial function $F(G,\alpha;k)$ ($\alpha=\alpha_{G,b}$) of $k$ such that for any Abelian group $A'$ of order $k$ and each $b':V(G)\to A'$ satisfying $\alpha_{G,b'}=\alpha$, $F(G,\alpha;k)$ equals the number of nowhere-zero $A'$-chains $\varphi$ in $G$ having boundaries equal to $b'$. In particular $F(G,\alpha;k)$ is the flow polynomial of $G$ if $\alpha(X)=0$ for each $X\in\Lambda(G)$. Finally we characterize $\alpha$ for which $F(G,\alpha;k)$ is nonzero and show that in this case $F(G,\alpha;k)$ has the same degree as the flow polynomial of $G$.
DOI :
10.37236/10445
Classification :
05C31, 05C21, 05C15
Mots-clés : nowhere-zero flows, Tutte polynomial
Mots-clés : nowhere-zero flows, Tutte polynomial
@article{10_37236_10445,
author = {Martin Kochol},
title = {Polynomials counting nowhere-zero chains in graphs},
journal = {The electronic journal of combinatorics},
year = {2022},
volume = {29},
number = {1},
doi = {10.37236/10445},
zbl = {1487.05132},
url = {http://geodesic.mathdoc.fr/articles/10.37236/10445/}
}
Martin Kochol. Polynomials counting nowhere-zero chains in graphs. The electronic journal of combinatorics, Tome 29 (2022) no. 1. doi: 10.37236/10445
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