Irreducibility of limits of Galois representations of Saito-Kurokawa type

Abstract

We prove (under certain assumptions) the irreducibility of the limit σ2 of a sequence of irreducible essentially self-dual Galois representations σk: GQ GL4(Qp) (as k approaches 2 in a p-adic sense) which mod p reduce (after semi-simplifying) to 1 with irreducible, two-dimensional of determinant , where is the mod p cyclotomic character. More precisely, we assume that σk are crystalline (with a particular choice of weights) and Siegel-ordinary at p. Such representations arise in the study of p-adic families of Siegel modular forms and properties of their limits as k 2 appear to be important in the context of the Paramodular Conjecture. The result is deduced from the finiteness of two Selmer groups whose order is controlled by p-adic L-values of an elliptic modular form (giving rise to ) which we assume are non-zero.