Tomescu's graph coloring conjecture for -connected graphs

Abstract

Let PG(k) be the number of proper k-colorings of a finite simple graph G. Tomescu's conjecture, which was recently solved by Fox, He, and Manners, states that PG(k) k!(k-1)n-k for all connected graphs G on n vertices with chromatic number k≥ 4. In this paper, we study the same problem with the additional constraint that G is -connected. For 2-connected graphs G, we prove a tight bound \[ PG(k) (k-1)!((k-1)n-k+1 + (-1)n-k), \] and show that equality is only achieved if G is a k-clique with an ear attached. For 3, we prove an asymptotically tight upper bound \[ PG(k) k!(k-1)n- - k + 1 + O((k-2)n), \] and provide a matching lower bound construction. For the ranges k ≥ or ≥ (k-2)(k-1)+1 we further find the unique graph maximizing PG(k). We also consider generalizing -connected graphs to connected graphs with minimum degree δ.