The strong fractional choice number of triangle-free planar graphs

Abstract

Let a,b be positive integers with a b. A graph G is (a,b)-choosable if, for every assignment of lists L(v) of size a to the vertices of G, there exists a choice of subsets C(v)⊂eq L(v) with |C(v)|=b for each v such that C(u) C(v)= whenever uv∈ E(G). We show that every triangle-free planar graph is (15m,4m)-choosable for any positive integer m. As an immediate consequence, the strong fractional choice number of triangle-free planar graphs is at most 15/4. This appears to be the first non-trivial upper bound on this parameter for this class of graphs. In particular, the case m=1 answers affirmatively a question posed by Jiang and Zhu in [J.~Combin.\ Theory Ser.~B, 2019].