On branching laws of Speh representations

Abstract

In this paper, we consider the branching law of the Speh representation Sp(π,n+l) of GL2n+2l with respect to the block diagonal subgroup GLn×GLn+2l for any irreducible generic representation π of GL2 over any p-adic field. We use the Shalika model of Sp(π,n) to construct certain zeta integrals, which were defined by Ginzburg and Kaplan independently, and study them. Finally, using these zeta integrals, we obtain a nonzero GLn×GLn+2l-map from Sp(π,n+l) to ττπ×Sp(π, l) for any irreducible representation τ of GLn. These results form part of the local theory of the Miyawaki lifting for unitary groups.

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