Lacunarity of Han-Nekrasov-Okounkov q-series

Abstract

A power series is called lacunary if `almost all' of its coefficients are zero. Integer partitions have motivated the classification of lacunary specializations of Han's extension of the Nekrasov-Okounkov formula. More precisely, we consider the modular forms \[Fa,b,c(z) := η(24az)a η(24acz)b-aη(24z),\] defined in terms of the Dedekind η-function, for integers a,c ≥ 1 where b ≥ 1 is odd throughout. Serre determined the lacunarity of the series when a = c = 1. Later, Clader, Kemper, and Wage extended this result by allowing a to be general, and completely classified the Fa,b,1(z) which are lacunary. Here, we consider all c and show that for a ∈ \1,2,3\, there are infinite families of lacunary series. However, for a ≥ 4, we show that there are finitely many triples (a,b,c) such that Fa,b,c(z) is lacunary. In particular, if a ≥ 4, b ≥ 7, and c ≥ 2, then Fa,b,c(z) is not lacunary. Underlying this result is the proof the t-core partition conjecture proved by Granville and Ono.