Nadir Matringe, Omer Offen
Published 2016-07-07Version 1
We study a relation between distinction and special values of local invariants for representations of the general linear group over a quadratic extension of $p$-adic fields. We show that the local Rankin-Selberg root number of any pair of distinguished representation is trivial and as a corollary we obtain an analogue for the global root number of any pair of distinguished cuspidal representations. We further study the extent to which the gamma factor at $1/2$ is trivial for distinguished representations as well as the converse problem.
Remark on representation theory of general linear groups over a non-archimedean local division algebra
Intertwining periods and distinction for p-adic Galois symmetric pairs
Unramified Whittaker functions for certain Brylinski-Deligne covering groups
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