Artin representations for GSp4 attached to real analytic Siegel cusp forms of weight (2,1)

Abstract

Let F be a vector-valued real analytic Siegel cusp eigenform of weight (2,1) with the eigenvalues - 512 and 0 for the two generators of the center of the algebra consisting of all Sp4()-invariant differential operators on the Siegel upper half plane of degree 2. Under the assumptions (1) the validity of the transfer of automorphic representations of GSp4 to GL4; (2) the existence of mod Galois representation attached to F and its lift to characteristic zero; (3) rationality of the space consisting of any such F; and (4) the integrality of Hecke polynomials of F, we construct a unique Artin representation of type GSp4 associated to F. Several examples which satisfy these assumptions are given by using various transfers and automorphic descent.