On The b-Chromatic Number of Regular Graphs Without 4-Cycle

Abstract

The b-chromatic number of a graph G, denoted by φ(G), is the largest integer k that G admits a proper k-coloring such that each color class has a vertex that is adjacent to at least one vertex in each of the other color classes. We prove that for each d-regular graph G which contains no 4-cycle, φ(G)≥d+32 and if G has a triangle, then φ(G)≥d+42. Also, if G is a d-regular graph which contains no 4-cycle and diam(G)≥6, then φ(G)=d+1. Finally, we show that for any d-regular graph G which does not contain 4-cycle and (G)≤d+12, φ(G)=d+1.