Eichler integrals of Eisenstein series as q-brackets of weighted t-hook functions on partitions

Abstract

We consider the t-hook functions on partitions fa,t: P→ C defined by fa,t(λ):=ta-1 Σh∈ Ht(λ)1ha, where Ht(λ) is the multiset of partition hook numbers that are multiples of t. The Bloch-Okounkov q-brackets fa,tq include Eichler integrals of the classical Eisenstein series. For even a≥ 2, we show that these q-brackets are natural pieces of weight 2-a sesquiharmonic and harmonic Maass forms, while for odd a≤ -1, we show that they are holomorphic quantum modular forms. We use these results to obtain new formulas of Chowla-Selberg type, and asymptotic expansions involving values of the Riemann zeta-function and Bernoulli numbers. We make use of work of Berndt, Han and Ji, and Zagier.