On t-relaxed 2-distant circular coloring of graphs

Abstract

Let k be an positive integer. For any two integers i and j in \0,1,…,k-1\, let |i-j|k=\|i-j|,k-|i-j|\ be the circular distance between i and j. Let t be a nonnegative integer. Suppose f is a mapping from V(G) to \0,1,…,k-1\. If adjacent vertices receive different integers, and for each vertex u of G, the number of neighbors v of u with |f(u)-f(v)|k=1 is at most t, then f is called a t-relaxed 2-distant circular k-coloring, or simply a (k2,t)*-coloring of G. If G has a (k2,t)*-coloring, then G is called (k2,t)*-colorable. In this paper, we prove that, for any two fixed integers k and t with k≥2 and t≥1, deciding whether G is (k2,t)*-colorable is NP-complete expect the case k=2 and the case k=3 and t≤3, which are polynomially solvable. For any outerplanar graph G, e show that all outerplanar graphs are (52,4)*-colorable, we prove that there is no fixed positive integer t such that all outerplanar graphs are (42,t)*-colorable.