Comparison of compact induction with parabolic induction

TL;DR

This paper compares compact and parabolic induction for reductive groups over non-archimedean fields, establishing isomorphisms under certain conditions and classifying supersingular representations.

Contribution

It introduces a new framework for understanding the relationship between compact and parabolic induction in positive characteristic, extending Herzig's results.

Findings

Intertwiner becomes an isomorphism after localization at a Hecke operator.

Defines and classifies K-supersingular irreducible smooth representations.

Provides a list of supercuspidal and K-supersingular representations.

Abstract

Let $F$ be any non archimedean locally compact field of residual characteristic $p$, let $G$ be any reductive connected $F$-group and let $K$ be any special parahoric subgroup of $G(F)$. We choose a parabolic $F$-subgroup $P$ of $G$ with Levi decomposition $P=MN$ in good position with respect to $K$. Let $C$ be an algebraically closed field of characteristic $p$. We choose an irreducible smooth $C$-representation $V$ of $K$. We investigate the natural intertwiner from the compact induced representation $\ind_{K}^{G(F)}V$ to the parabolically induced representation $\Ind_{P(F)}^{G(F)}(\ind_{M(F) \cap K}^{M(F)}V_{N(F)\cap K})$. Under a regularity condition on $V$, we show that the intertwiner becomes an isomorphism after a localisation at a specific Hecke operator. When $F$ has characteristic 0, $G$ is $F$-split and $K$ is hyperspecial, the result was essentially proved by Herzig. We define the notion of $K$-supersingular irreducible smooth $C$-representation of $G(F)$ which extends Herzig's definition for admissible irreducible representations and we give a list of $K$-supersingular irreducible representations which are supercuspidal and conversely a list of supercuspidal representations which are $K$-supersingular.