Traces of partition Eisenstein series

TL;DR

This paper introduces partition Eisenstein series and their traces, providing explicit formulas for generating functions and moments related to lattice points and crank functions, revealing their connection to Jacobi forms.

Contribution

The paper defines partition Eisenstein series and traces, linking them to well-known generating functions and moments, and demonstrates their role in the Taylor coefficients of Jacobi forms.

Findings

Explicit formulas for generating functions and moments.

Partition Eisenstein traces relate to lattice points and crank functions.

Connections to Taylor coefficients of Jacobi forms.

Abstract

We study "partition Eisenstein series", extensions of the Eisenstein series $G_{2k}(\tau),$ defined by $$\lambda=(1^{m_1}, 2^{m_2},\dots, k^{m_k}) \vdash k \ \ \ \ \ \longmapsto \ \ \ \ \ G_{\lambda}(\tau):= G_2(\tau)^{m_1} G_4(\tau)^{m_2}\cdots G_{2k}(\tau)^{m_k}. $$ For functions $\phi: \mathcal{P}\rightarrow \mathbb{C}$ on partitions, the weight $2k$ "partition Eisenstein trace" is the quasimodular form $$ {\mathrm{Tr}}_k(\phi;\tau):=\sum_{\lambda \vdash k} \phi(\lambda)G_{\lambda}(\tau). $$ These traces give explicit formulas for some well-known generating functions, such as the $k$th elementary symmetric functions of the inverse points of 2-dimensional complex lattices $\mathbb{Z}\oplus \mathbb{Z}\tau,$ as well as the $2k$th power moments of the Andrews-Garvan crank function. To underscore the ubiquity of such traces, we show that their generalizations give the Taylor coefficients of generic Jacobi forms with torsional divisor.