Maximally Edge-Connected Realizations and Kundu's k-factor Theorem

Abstract

A simple graph G with edge-connectivity λ(G) and minimum degree δ(G) is maximally edge connected if λ(G)=δ(G). In 1964, given a non-increasing degree sequence π=(d1,…,dn), Jack Edmonds showed that there is a realization G of π that is k-edge-connected if and only if dn≥ k with Σi=1ndi≥ 2(n-1) when dn=1. We strengthen Edmonds's result by showing that given a realization G0 of π if Z0 is a spanning subgraph of G0 with δ(Z0)≥ 1 such that |E(Z0)|≥ n-1 when δ(G0)=1, then there is a maximally edge-connected realization of π with G0-E(Z0) as a subgraph. Our theorem tells us that there is a maximally edge-connected realization of π that differs from G0 by at most n-1 edges. For δ(G0)≥ 2, if G0 has a spanning forest with c components, then our theorem says there is a maximally edge-connected realization that differs from G0 by at most n-c edges. As an application we combine our work with Kundu's k-factor Theorem to show there is a maximally edge-connected realization with a (k1,…,kn)-factor for k≤ ki≤ k+1 and present a partial result to a conjecture that strengthens the regular case of Kundu's k-factor theorem.