Ring of modular forms: Difference between revisions

In mathematics, a ring of modular forms is a graded ring generated by modular forms. Rings of modular forms give algebraic structure to the space of all modular forms of a given group.

Definition

Let Γ be a subgroup of SL(2, Z) that is of finite index and let ${\displaystyle M_{k}(\Gamma )}$ be the ring of modular forms of weight k. The ring of modular forms of Γ is the graded ring ${\displaystyle M(\Gamma )=\bigoplus M_{k}(\Gamma )}$.^[1]

Properties

The ring of modular forms is a graded Lie algebra since the Lie bracket ${\displaystyle [f,g]=kfg'-\ell f'g}$ of modular forms f and g of respective weights k and ℓ is a modular form of weight k + ℓ + 2.^[1] In fact, a bracket can be defined for the n-th derivative of modular forms and such a bracket is called a Rankin–Cohen brackets.^[1]

References

1. Zagier, Don. "Elliptic Modular Forms and Their Applications" (PDF). In Bruinier, Jan Hendrik; van der Geer, Gerard; Harder, Günter; Zagier, Don (eds.). The 1-2-3 of Modular Forms. Universitext. Springer-Verlag. pp. 1–103. doi:10.1007/978-3-540-74119-0_1. ISBN 978-3-540-74119-0.