Irreducibility of the parabolic induction of essentially Speh representations and a representation of Arthur type over a p-adic field

Abstract

Let F be a p-adic field. In this article, we consider representations of split special orthogonal groups SO2n+1(F) and symplectic groups Sp2n(F) of rank n. We denote by π1 × … × πr π the normalized parabolically induced representation of either. Now let ui be essentially Speh representations and π a representation of Arthur type. We prove that the parabolic induction u1 × … × ur π is irreducible if and only if ui × uj, ui × uj and ui π are irreducible for all choices of i≠ j. If ui are Speh representations, we determine the composition series of the above parabolically induced representation. Through this, we are able to produce a new collection of unitary representations.

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