English

A construction of $\mathfrak v$-adic modular forms

Number Theory 2013-06-20 v1

Abstract

The classical theory of pp-adic (elliptic) modular forms arose in the 1970's from the work of J.-P.\ Serre \cite{se1} who took pp-adic limits of the qq-expansions of these forms. It was soon expanded by N.\ Katz \cite{ka1} with a more functorial approach. Since then the theory has grown in a variety of directions. In the late 1970's, the theory of modular forms associated to Drinfeld modules was born in analogy with elliptic modular forms \cite{go1}, \cite{go2}. The associated expansions at \infty are quite complicated and no obvious limits at finite primes v{\mathfrak v} were apparent. Recently, however, there has been progress in the v\mathfrak v-adic theory, \cite{vi1}. Also recently, A.\ Petrov \cite{pe1}, building on previous work of \cite{lo1}, showed that there is an intermediate expansion at \infty called the "AA-expansion," and he constructed families of cusp forms with such expansions. It is our purpose in this note to show that Petrov's results also lead to interesting v{\mathfrak v}-adic cusp forms \`a la Serre. Moreover the existence of these forms allows us to readily conclude a mysterious decomposition of the associated Hecke action.

Keywords

Cite

@article{arxiv.1306.4344,
  title  = {A construction of $\mathfrak v$-adic modular forms},
  author = {David Goss},
  journal= {arXiv preprint arXiv:1306.4344},
  year   = {2013}
}
R2 v1 2026-06-22T00:36:19.888Z