Modular analogs of character formulas and minimal lifts of modular forms

Abstract

If f is a mod-3 eigenform of weight 2 and level Γ0(2) for a prime such that -1 3, and is a vexing prime for f, we show that there is no obstruction to finding a minimal lift of f, but that there is an obstruction to finding a nonminimal lift. The key new ingredient that we prove is a modular analog of the standard character formula for a cuspidal representation of GL2(F), an enhancement that allows us to easily compute the group cohomology of a 3-adic lattice in such a representation. In fact, we provide a general framework for proving such modular analogs for a broader class of representations using results of Broué and Puig in modular representation theory. We show that this class includes certain Deligne--Lusztig representations and representations coming from higher-depth supercuspidal representations of GL2.