The t-Tone Chromatic Number of Classes of Sparse Graphs

Abstract

For a graph G and t,k∈Z+ a t-tone k-coloring of G is a function f:V(G)→ [k]t such that |f(v) f(w)| < d(v,w) for all distinct v,w ∈ V(G). The t-tone chromatic number of G, denoted τt(G), is the minimum k such that G is t-tone k-colorable. For small values of t, we prove sharp or nearly sharp upper bounds on the t-tone chromatic number of various classes of sparse graphs. In particular, we determine τ2(G) exactly when mad(G) < 12/5 and bound τ2(G), up to a small additive constant, when G is outerplanar. We also determine τt(Cn) exactly when t∈\3,4,5\.

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