Some results in the theory of genuine representations of the metaplectic double cover of GSp2n(F) over p-adic fields (1303.6256v1)

Abstract: Let F be a p-adic field and let G(n) and G(n) be the metaplectic double covers of the general symplectic group and symplectic group attached to a 2n dimensional symplectic space over F. We show here that if n is odd then all the genuine irreducible representations of G(n) are induced from a normal subgroup of finite index closely related to G(n). Thus, we reduce, in this case, the theory of genuine admissible representations of G(n) to the better understood corresponding theory of G`(n). For odd n we also prove the uniqueness of certain Whittaker functionals along with Rodier type of Heredity. Our results apply also to all parabolic subgroups of G(n) if n is odd and to some of the parabolic subgroups of G(n) if n is even. We prove some irreducibility criteria for parabolic induction on G(n) for both even and odd n. As a corollary we show, among other results, that while for odd n, all genuine principal series representations of G(n) induced from unitary representations are irreducible, there exist reducibility points on the unitary axis if n is even. We also list all the reducible genuine principal series representations of G(2) provided that the F is not 2-adic.