Exponentially Many 4-List-Colorings of Triangle-Free Graphs on Surfaces

Abstract

Thomassen proved that every planar graph G on n vertices has at least 2n/9 distinct L-colorings if L is a 5-list-assignment for G and at least 2n/10000 distinct L-colorings if L is a 3-list-assignment for G and G has girth at least five. Postle and Thomas proved that if G is a graph on n vertices embedded on a surface of genus g, then there exist constants ε,cg > 0 such that if G has an L-coloring, then G has at least cg2ε n distinct L-colorings if L is a 5-list-assignment for G or if L is a 3-list-assignment for G and G has girth at least five. More generally, they proved that there exist constants ε,α>0 such that if G is a graph on n vertices embedded in a surface of fixed genus g, H is a proper subgraph of G, and φ is an L-coloring of H that extends to an L-coloring of G, then φ extends to at least 2ε(n - α(g + |V(H)|)) distinct L-colorings of G if L is a 5-list-assignment or if L is a 3-list-assignment and G has girth at least five. We prove the same result if G is triangle-free and L is a 4-list-assignment of G, where ε=18, and α= 130.