Asymptotically optimal neighbor sum distinguishing total colorings of graphs

Abstract

Given a proper total k-coloring c:V(G) E(G)\1,2,…,k\ of a graph G, we define the value of a vertex v to be c(v) + Σuv ∈ E(G) c(uv). The smallest integer k such that G has a proper total k-coloring whose values form a proper coloring is the neighbor sum distinguishing total chromatic number of G, "(G). Pil\'sniak and Wo\'zniak (2013) conjectured that "(G)≤ (G)+3 for any simple graph with maximum degree (G). In this paper, we prove this bound to be asymptotically correct by showing that "(G)≤ (G)(1+o(1)). The main idea of our argument relies on Przybyo's proof (2014) regarding neighbor sum distinguishing edge-colorings.