Sharp conditions for the existence of an even [a,b]-factor in a graph

Abstract

Let a and b be positive integers. An even [a,b]-factor of a graph G is a spanning subgraph H such that for every vertex v ∈ V(G), dH(v) is even and a dH(v) b. Matsuda conjectured that if G is an n-vertex 2-edge-connected graph such that n 2a+b+a2-3ab - 2, δ(G) a, and σ2(G) 2ana+b, then G has an even [a,b]-factor. In this paper, we provide counterexamples, which are highly connected. Furthermore, we give sharp sufficient conditions for a graph to have an even [a,b]-factor. For even an, we conjecture a lower bound for λ1(G) in an n-vertex graph to have an [a,b]-factor, where λ1(G) is the largest eigenvalue of G.