Distant total irregularity strength of graphs via random vertex ordering

Abstract

Let c:V E\1,2,…,k\ be a (not necessarily proper) total colouring of a graph G=(V,E) with maximum degree . Two vertices u,v∈ V are sum distinguished if they differ with respect to sums of their incident colours, i.e. c(u)+Σe uc(e)≠ c(v)+Σe vc(e). The least integer k admitting such colouring c under which every u,v∈ V at distance 1≤ d(u,v)≤ r in G are sum distinguished is denoted by tsr(G). Such graph invariants link the concept of the total vertex irregularity strength of graphs with so called 1-2-Conjecture, whose concern is the case of r=1. Within this paper we combine probabilistic approach with purely combinatorial one in order to prove that tsr(G)≤ (2+o(1))r-1 for every integer r≥ 2 and each graph G, thus improving the previously best result: tsr(G)≤ 3r-1.