English

The Ring of Quasimodular Forms for a Cocompact Group

Number Theory 2019-08-23 v1

Abstract

We describe the additive structure of the graded ring M~\widetilde{M}_* of quasimodular forms over any discrete and cocompact group ΓPSL(2,\RM).\Gamma \subset \rm{PSL}(2, \RM). We show that this ring is never finitely generated. We calculate the exact number of new generators in each weight kk. This number is constant for kk sufficiently large and equals dim\CM(I/II~2),\dim_{\CM}(I / I \cap \widetilde{I}^2), where II and I~\widetilde{I} are the ideals of modular forms and quasimodular forms, respectively, of positive weight. We show that M~\widetilde{M}_* is contained in some finitely generated ring R~\widetilde{R}_* of meromorphic quasimodular forms with dimR~k=O(k2),\dim \widetilde{R}_k = O(k^2), i.e. the same order of growth as M~.\widetilde{M}_*.

Keywords

Cite

@article{arxiv.math/0603268,
  title  = {The Ring of Quasimodular Forms for a Cocompact Group},
  author = {Najib Ouled Azaiez},
  journal= {arXiv preprint arXiv:math/0603268},
  year   = {2019}
}

Comments

22 pages, 1 figure