Complexity of the conditional colorability of graphs

Abstract

For an integer r>0, a conditional (k,r)-coloring of a graph G is a proper k-coloring of the vertices of G such that every vertex v of degree d(v) in G is adjacent to vertices with at least min\r, d(v)\ different colors. The smallest integer k for which a graph G has a conditional (k,r)-coloring is called the rth order conditional chromatic number, denoted by r(G). It is easy to see that the conditional coloring is a generalization of the traditional vertex coloring for which r=1. In this paper, we consider the complexity of the conditional colorings of graphs. The main result is that the conditional (3,2)-colorability is NP-complete for triangle-free graphs with maximum degree at most 3, which is different from the old result that the traditional 3-colorability is polynomial solvable for graphs with maximum degree at most 3. This also implies that it is NP-complete to determine if a graph of maximum degree 3 is (3,2)- or (4,2)-colorable. Also we have proved that some old complexity results for traditional colorings still hold for the conditional colorings.