English

Almost every vector valued modular form is an oldform

Number Theory 2014-01-28 v2

Abstract

In this article we show that 'most' of the vector valued modular forms w.r.t. the Weil representation on the groups rings C[D]\mathbb{C}[D] of discriminant forms D are oldforms. The precise meaning of oldform is that the form can be represented as a sum of lifts of vector valued modular forms on group rings of quotients H/HH^\bot/H for isotropic subgroups H of D. In this context, 'most' means that all forms are oldforms if there is a part Z/peZ\mathbb{Z}/p^e \mathbb{Z} inside a p-part of D that is repeated several times (i.e. >= 4,5,7,9 depending on p and e). We will proceed by giving an oldform detection mechanism. This criterion also gives rise to an efficient algorithm for computing the decomposition of cusp forms into their spaces of old- and newforms when only given the Fourier coefficients of a basis of the space of cusp forms.

Keywords

Cite

@article{arxiv.1401.6214,
  title  = {Almost every vector valued modular form is an oldform},
  author = {Fabian Werner},
  journal= {arXiv preprint arXiv:1401.6214},
  year   = {2014}
}

Comments

42 pages

R2 v1 2026-06-22T02:53:46.965Z