Asai Gamma Factors and Distinction in families
Abstract
Let F be a finite extension of Qp and let E be a quadratic extension of F. A representation (π,V) of GLn(E) is said to be GLn(F)-distinguished if there exists a non-zero linear functional φ on V such that φ(π(h)v) = φ(v) for all h ∈ GLn(F) and v ∈ V. In this article, we study the notion of GLn(F)-distinguished representations for R[ GLn(E)] modules of Whittaker type, where R is a Noetherian algebra over the ring of Witt vectors of F with p. We first derive a functional equation, which gives the existence of the Asai γ-factors associated with R[ GLn(E)] modules of Whittaker type. We then provide a necessary condition for cuspidal R[ GLn(E)] modules of Whittaker type to be Whittaker GLn(F)-distinguished, expressed in terms of their Asai γ-factors.
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