On 1-sum flows in undirected graphs

TL;DR

This paper investigates the existence of 1-sum flows in undirected graphs, characterizing bipartite graphs that admit certain flows and establishing conditions under which regular graphs have specific 1-sum flows.

Contribution

It characterizes bipartite graphs with 1-sum flows over specific sets and proves that certain regular graphs admit 1-sum flows with values in {-1,0,1}.

Findings

Characterization of bipartite graphs with 1-sum R*-flows and Z*-flows.

Proof that all k-regular graphs with odd k or k ≡ 2 mod 4 admit 1-sum {-1,0,1}-flows.

Analysis of existence conditions for gamma-L-flows in undirected graphs.

Abstract

Let G=(V,E) be a simple undirected graph. For a given set L of the real line, a function omega from E to L is called an L-flow. Given a vector gamma whose coordinates are indexed by V, we say that omega is a gamma-L-flow if for each v in V, the sum of the values on the edges incident to v is gamma(v). If gamma(v)=c, for all v in V, then the gamma-L-flow is called a c-sum L-flow. In this paper we study the existence of gamma-L-flows for various choices of sets L of real numbers, with an emphasis on 1-sum flows. Given a natural k number, a c-sum k-flow is a c-sum flow with values from the set {-1,1,...,1-k, k-1}. Let L be a subset of real numbers containing 0 and let L* be L minus 0 by L*. Answering a question from a recent paper we characterize which bipartite graphs admit a 1-sum R*-flow or a 1-sum Z*-flow. We also show that that every k-regular graph, with k either odd or congruent to 2 modulo 4, admits a 1-sum {-1, 0, 1}-flow.