Non-tempered Ext Branching Laws for the p-adic General Linear Group
Abstract
Let F be a non-archimedean local field. Let π1 and π2 be irreducible Arthur type representations of GLn(F) and GLn-1(F) respectively. We study Ext branching laws when π1 and π2 are products of discrete series representations and their Aubert-Zelevinsky duals. We obtain an Ext analogue of the local non-tempered Gan-Gross-Prasad conjecture in this case.
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