On the total neighbour sum distinguishing index of graphs with bounded maximum average degree

Abstract

A proper total k-colouring of a graph G=(V,E) is an assignment c : V E \1,2,…,k\ of colours to the edges and the vertices of G such that no two adjacent edges or vertices and no edge and its end-vertices are associated with the same colour. A total neighbour sum distinguishing k-colouring, or tnsd k-colouring for short, is a proper total k-colouring such that Σe uc(e)+c(u)≠ Σe vc(e)+c(v) for every edge uv of G. We denote by ''(G) the total neighbour sum distinguishing index of G, which is the least integer k such that a tnsd edge k-colouring of G exists. It has been conjectured that ''(G) ≤ (G) + 3 for every graph G. In this paper we confirm this conjecture for any graph G with mad(G)<143 and (G) ≥ 8.