Deformations of Saito-Kurokawa type and the Paramodular Conjecture (with an appendix by Cris Poor, Jerry Shurman, and David S. Yuen)

Abstract

We study short crystalline, minimal, essentially self-dual deformations of a mod p non-semisimple Galois representation σ with σ ss=k-2 k-1, where is the mod p cyclotomic character and is an absolutely irreducible reduction of the Galois representation f attached to a cusp form f of weight 2k-2. We show that if the Bloch-Kato Selmer groups H1f(Q, f(1-k) Qp/Zp) and H1f(Q, (2-k)) have order p, and there exists a characteristic zero absolutely irreducible deformation of σ then the universal deformation ring is a dvr. When k=2 this allows us to establish the modularity part of the Paramodular Conjecture in cases when one can find a suitable congruence of Siegel modular forms. As an example we prove the modularity of the abelian surface of conductor 731. When k>2, we obtain an R red=T theorem showing modularity of all such deformations of σ.