On representations of GL(n) distinguished by GL(1)*GL(n-1) over a quaternion division algebra

Abstract

Let D be a quaternion division algebra over a non-Archimedean local field F of characteristic zero, and let Gn=GLn(D). Let H1,n-1 denote the subgroup of Gn consisting of block-diagonal matrices of the form diag(g1,g2), where g1∈ G1 and g2∈ Gn-1. In this article, we formulate a conjectural classification of irreducible smooth H1,n-1-distinguished representations of Gn for n>2. We prove this conjecture in the cases n=3 and n=4. When n=2, the results are well known due to the contributions by various authors.