The average distance of spanning trees in terms of independence number

Abstract

Let G be a connected graph with vertex set V(G), and denote by dG(u,v) the distance from u to v in G, for any u,v ∈ V(G). The average distance of an n-vertex connected graph G, denoted by μ(G), is defined to be the average of all distances between all pairs of vertices in G, i.e., μ (G) = n2-1 Σ\u,v\ ⊂ V(G)dG(u,v). The problem of finding a spanning tree of minimum average distance is known to be NP-hard, so establishing an upper bound for the minimum average distance among all spanning trees is of particular interest. Mukwembi (J. Graph Theory, 2014) showed that if G is a connected graph of order n with independence number α, where n > 2 α - 1, then G has a spanning tree T such that μ(T) α + 2. In this paper, we first improve the upper bound to μ(T) < α + 1 for α 1, and then we find the bound could be further improved when α becomes larger, so a better upper bound \[ μ(T) < \ arrayll α+1 & if 1α 6,\\ α+12+4(α-1)α2 & if α 7, array . \] is established later. In the end, we give a remark to indicate our new upper bound is best possible in the sense of asymptotics (when n and α are large enough).