A note on Gupta's co-density conjecture

Abstract

Let G be a multigraph. A subset F of E(G) is an edge cover of G if every vertex of G is incident to an edge of F. The cover index, (G), is the largest number of edge covers into which the edges of G can be partitioned. Clearly (G) δ(G), the minimum degree of G. For U⊂eq V(G), denote by E+(U) the set of edges incident to a vertex of U. When |U| is odd, to cover all the vertices of U, any edge cover needs to contain at least (|U|+1)/2 edges from E+(U), indicating (G) |E+(U)|/ (|U|+1)/2. Let c(G), the co-density of G, be defined as the minimum of |E+(U)|/((|U|+1)/2) ranging over all U⊂eq V(G) with |U| odd and at least 3. Then c(G) provides another upper bound on (G). Thus (G) \δ(G), c(G) \. For a lower bound on (G), in 1967, Gupta conjectured that (G) \δ(G)-1, c(G) \. Gupta showed that the conjecture is true when G is simple, and Cao et al. verified this conjecture when c(G) is not an integer. In this note, we confirm the conjecture when the maximum multiplicity of G is at most two or \δ(G)-1, c(G) \ 6.