English

The arithmetic of modular grids

Number Theory 2022-05-13 v3

Abstract

A modular grid is a pair of sequences (fm)m(f_m)_m and (gn)n(g_n)_n of weakly holomorphic modular forms such that for almost all mm and nn, the coefficient of qnq^n in fmf_m is the negative of the coefficient of qmq^m in gng_n. Zagier proved this coefficient duality in weights 1/21/2 and 3/23/2 in the Kohnen plus space, and such grids have appeared for Poincar\'{e} series, for modular forms of integral weight, and in many other situations. We give a general proof of coefficient duality for canonical row-reduced bases of spaces of weakly holomorphic modular forms of integral or half-integral weight for every group ΓSL2(R)\Gamma \subseteq {\text{SL}}_2(\mathbb{R}) commensurable with SL2(Z){\text{SL}}_2(\mathbb{Z}). We construct bivariate generate functions that encode these modular forms, and study linear operations on the resulting modular grids.

Keywords

Cite

@article{arxiv.2012.14403,
  title  = {The arithmetic of modular grids},
  author = {Michael Griffin and Paul Jenkins and Grant Molnar},
  journal= {arXiv preprint arXiv:2012.14403},
  year   = {2022}
}

Comments

Second revision

R2 v1 2026-06-23T21:30:45.658Z