Overconvergent modular forms are highest weight vectors in the Hodge-Tate weight zero part of completed cohomology

Abstract

We construct a (gl2, B(Qp)) and Hecke-equivariant cup product pairing between overconvergent modular forms and the local cohomology at 0 of a sheaf on P1, landing in the compactly supported completed Cp-cohomology of the modular curve. The local cohomology group is a highest-weight Verma module, and the cup product is non-trivial on a highest weight vector for any overconvergent modular form of infinitesimal weight not equal to 1. For classical weight k≥ 2, the Verma has an algebraic quotient H1(P1, O(-k)), and on classical forms the pairing factors through this quotient, giving a geometric description of "half" of the locally algebraic vectors in completed cohomology; the other half is described by a pairing with the roles of H1 and H0 reversed between the modular curve and P1. Under minor assumptions, we deduce a conjecture of Gouvea on the Hodge-Tate-Sen weights of Galois representations attached to overconvergent modular forms. Our main results are essentially a strict subset of those obtained independently by Lue Pan in arXiv:2008.07099, but the perspective here is different and the proofs are short and use simple tools: a Mayer-Vietoris cover, a cup product, and a boundary map in group cohomology.