On the structure of modules of vector valued modular forms
arXiv:1509.07494
Abstract
If $Ï$ denotes a finite dimensional complex representation of $\textbf{SL}_2(\textbf{Z})$, then it is known that the module $M(Ï)$ of vector valued modular forms for $Ï$ is free and of finite rank over the ring $M$ of scalar modular forms of level one. This paper initiates a general study of the structure of $M(Ï)$. Among our results are absolute upper and lower bounds, depending only on the dimension of $Ï$, on the weights of generators for $M(Ï)$, as well as upper bounds on the multiplicities of weights of generators of $M(Ï)$. We provide evidence, both computational and theoretical, that a stronger three-term multiplicity bound might hold. An important step in establishing the multiplicity bounds is to show that there exists a free-basis for $M(Ï)$ in which the matrix of the modular derivative operator does not contain any copies of the Eisenstein series $E_6$ of weight six.
21 pages