New results in t-tone coloring of graphs

Abstract

A t-tone k-coloring of G assigns to each vertex of G a set of t colors from \1,..., k\ so that vertices at distance d share fewer than d common colors. The t-tone chromatic number of G, denoted τt(G), is the minimum k such that G has a t-tone k-coloring. Bickle and Phillips showed that always τ2(G) [(G)]2 + (G), but conjectured that in fact τ2(G) 2(G) + 2; we confirm this conjecture when (G) 3 and also show that always τ2(G) (2 + 2)(G). For general t we prove that τt(G) (t2+t)(G). Finally, for each t 2 we show that there exist constants c1 and c2 such that for every tree T we have c1 (T) τt(T) c2(T).