Shalika models for general linear groups

Abstract

We define a generalization of Shalika models for GLn+m(F) and prove that they are multiplicity-free, where F is either a non-Archimedean local field or a finite field and n,m are any natural numbers. In particular, we give new proof for the case of n=m. We also show that the Bernstein-Zelevinsky product of an irreducible representation of GLn(F) and the trivial representation of GLm(F) is multiplicity-free. We relate the two results by a conjecture about twisted parabolic induction of Gelfand pairs.

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