Total b-chromatic Colouring of Graphs

Abstract

A b-chromatic colouring of a graph G is a proper k-colouring of the vertices of G, for some integer k, such that, for each colour i (1≤ i≤ k), there exists a vertex v of colour i such that v is adjacent to a vertex of colour j, for each j (1≤ j≤ k, j≠ i). The b-chromatic number of G is the maximum integer k such that G admits a b-chromatic colouring using k colours. In this paper we introduce the concept of a total b-chromatic colouring, which extends the notion of b-chromatic colourings to both vertices and edges in a graph. We show that the problem of computing the total b-chromatic number is NP-hard in general graphs. On the other hand for a subclass of caterpillars we give a polynomial-time algorithm to compute the total b-chromatic number, and indeed a total b-chromatic colouring with the maximum number of colours.