English

The module of vector-valued modular forms is Cohen-Macaulay

Number Theory 2019-04-18 v1 Commutative Algebra

Abstract

Let HH denote a finite index subgroup of the modular group Γ\Gamma and let ρ\rho denote a finite-dimensional complex representation of H.H. Let M(ρ)M(\rho) denote the collection of holomorphic vector-valued modular forms for ρ\rho and let M(H)M(H) denote the collection of modular forms on HH. Then M(ρ)M(\rho) is a Z\textbf{Z}-graded M(H)M(H)-module. It has been proven that M(ρ)M(\rho) may not be projective as a M(H)M(H)-module. We prove that M(ρ)M(\rho) is Cohen-Macaulay as a M(H)M(H)-module. We also explain how to apply this result to prove that if M(H)M(H) is a polynomial ring then M(ρ)M(\rho) is a free M(H)M(H)-module of rank dim ρ.\textrm{dim } \rho.

Keywords

Cite

@article{arxiv.1904.08033,
  title  = {The module of vector-valued modular forms is Cohen-Macaulay},
  author = {Richard Gottesman},
  journal= {arXiv preprint arXiv:1904.08033},
  year   = {2019}
}

Comments

Six pages

R2 v1 2026-06-23T08:42:10.424Z