Wiener index in graphs with given minimum degree and maximum degree

Abstract

Let G be a connected graph of order n.The Wiener index W(G) of G is the sum of the distances between all unordered pairs of vertices of G. In this paper we show that the well-known upper bound ( nδ+1+2) n 2 on the Wiener index of a graph of order n and minimum degree δ [M. Kouider, P. Winkler, Mean distance and minimum degree. J. Graph Theory 25 no. 1 (1997)] can be improved significantly if the graph contains also a vertex of large degree. Specifically, we give the asymptotically sharp bound W(G) ≤ n-+δ 2 n+2δ+1+ 2n(n-1) on the Wiener index of a graph G of order n, minimum degree δ and maximum degree . We prove a similar result for triangle-free graphs, and we determine a bound on the Wiener index of C4-free graphs of given order, minimum and maximum degree and show that it is, in some sense, best possible.