Filtrations of dc-weak eigenforms

Abstract

The notions of strong, weak and dc-weak eigenforms mod pn was introduced and studied by Chen, Kiming and Wiese. In this work, we prove that there can be no uniform weight bound (that is, depending only on p, n) on dc-weak eigenforms mod pn of fixed level when n ≥ 2. This is in contrast with the result of Kiming, Rustom and Wiese which establishes a uniform weight bound on strong eigenforms mod pn. As a step towards studying weights bounds for weak eigenforms mod pn, we provide a criterion which allows us to detect whether a given dc-weak eigenform mod pn is weak.