Potentially diagonalizable modular lifts of large weight

Abstract

We prove that for a Hecke cuspform f∈ Sk(0(N),) and a prime l>\k,6\ such that l N, there exists an infinite family \kr\r≥ 1⊂eqZ such that for each kr, there is a cusp form fkr∈ Skr(0(N),) such that the Deligne representation fkr,l is a crystaline and potentially diagonalizable lift of f,l. When f is l-ordinary, we base our proof on the theory of Hida families, while in the non-ordinary case, we adapt a local-to-global argument due to Khare and Wintenberger in the setting of their proof of Serre's modularity conjecture, together with a result on existence of lifts with prescribed local conditions over CM fields, a flatness result due to B\"ockle and a local dimension result by Kisin. We discuss the motivation and tentative future applications of our result in ongoing research on the automorphy of GL2n-representations in the higher level case.