Fengming Dong
Published 2020-07-10Version 1
For a bridgeless graph $G$, its flow polynomial is defined to be the function $F(G,q)$ which counts the number of nonwhere-zero $\Gamma$-flows on an orientation of $G$ whenever $q$ is a positive integer and $\Gamma$ is an additive Abelian group of order $q$. It was introduced by Tutte in 1950 and the locations of zeros of this polynomial have been studied by many researchers. This article gives a survey on the results and problems on the study of real zeros of flow polynomials.
Comments: 19 pages, 4 figures and 50 references
Journal: J. Graph Theory 92 (Dec 2019), 361-376
Defective 2-colorings of planar graphs without 4-cycles and 5-cycles
On Zero-free Intervals of Flow Polynomials
On graphs whose flow polynomials have real roots only
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