Mostar index and bounded maximum degree

Abstract

Dosli\'c et al. defined the Mostar index of a graph G as Mo(G)=Σuv∈ E(G)|nG(u,v)-nG(v,u)|, where, for an edge uv of G, the term nG(u,v) denotes the number of vertices of G that have a smaller distance in G to u than to v. For a graph G of order n and maximum degree at most , we show Mo(G)≤ 2n2-(1-o(1))cn((n)), where c>0 only depends on and the o(1) term only depends on n. Furthermore, for integers n0 and at least 3, we show the existence of a -regular graph of order n at least n0 with Mo(G)≥ 2n2-c'n(n), where c'>0 only depends on .