Structure of the Unramified L-packet

Abstract

Let G be an unramified connected reductive group defined over a non-archemedian local field k and let T be a maximal torus in G. Let λ be an unramified character of T. Then the conjugacy classes of hyperspecial subgroups of G(k) is a principal homogenous space for a certain finite abelian group . Also, the L-packet (λ) associated to λ is parametrized by an abelian group R. We show that R is naturally a homogenous space for . Further, let π∈(λ), where ∈R and let [K] denote the conjugacy class of hyperspecial subgroup K. Then we show that πK≠0 if and only if πω·Kω≠0 where ω∈ and Kω is any hyperspecial subgroup in the conjugacy class ω·[K].