Distinguished positive regular representations
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Abstract:
Let $G$ be a tamely ramified reductive $p$-adic group. We study distinction of a class of irreducible admissible representations of $G$ by the group of fixed points $H$ of an involution of $G$. The representations correspond to $G$-conjugacy classes of pairs $(T,phi)$, where $T$ is a tamely ramified maximal torus of $G$ and $phi$ is a quasicharacter of $T$ whose restriction to the maximal pro-$p$-subgroup satisfies a regularity condition. Under mild restrictions on the residual characteristic of $F$, we derive necessary conditions for $H$-distinction of a representation corresponding to $(T,phi)$, expressed in terms of properties of $T$ and $phi$ relative to the involution. We prove that if an $H$-distinguished representation arises from a pair $(T,phi)$ such that $T$ is stable under the involution and compact modulo $(Tcap H)Z$ (here, $Z$ is the centre of $G$), then the representation is $H$-relatively supercuspidal.
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Journal title
volume 43 issue Issue 4 (Special Issue)
pages 291- 311
publication date 2017-08-30
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