A note on counting flows in signed graphs

Abstract

Tutte initiated the study of nowhere-zero flows and proved the following fundamental theorem: For every graph G there is a polynomial f so that for every abelian group of order n, the number of nowhere-zero -flows in G is f(n). For signed graphs (which have bidirected orientations), the situation is more subtle. For a finite group , let ε2() be the largest integer d so that has a subgroup isomorphic to Z2d. We prove that for every signed graph G and d 0 there is a polynomial fd so that fd(n) is the number of nowhere-zero -flows in G for every abelian group with ε2() = d and || = 2d n. Beck and Zaslavsky had previously established the special case of this result when d=0 (i.e., when has odd order).