On b-acyclic chromatic number of a graph

Abstract

Let G be a graph. We introduce the acyclic b-chromatic number of G as an analogue to the b-chromatic number of G. An acyclic coloring of a graph G is a map c:V(G)→ \1,…,k\ such that c(u)≠ c(v) for any uv∈ E(G) and the induced subgraph on vertices of any two colors i,j∈ \1,…,k\ induces a forest. On the set of all acyclic colorings of G we define a relation whose transitive closure is a strict partial order. The minimum cardinality of its minimal element is then the acyclic chromatic number A(G) of G and the maximum cardinality of its minimal element is the acyclic b-chromatic number Ab(G) of G. We present several properties of Ab(G). In particular, we derive Ab(G) for several known graph families, derive some bounds for Ab(G), compare Ab(G) with some other parameters and generalize some influential tools from b-colorings to acyclic b-colorings.