On the Bernstein-Zelevinsky classification and epsilon factors in families

TL;DR

This paper introduces a Hecke theoretic concept of families of smooth admissible representations of $GL_n(F)$, demonstrating their rigidity and analytic properties of epsilon factors, with applications to eigenvarieties.

Contribution

It defines a new notion of families of representations that reveals strong rigidity and analyticity properties of epsilon factors in these families.

Findings

Families exhibit strong rigidity in Bernstein-Zelevinsky presentations.

Epsilon factors vary analytically within these families.

Results apply to eigenvarieties, showing epsilon factors are analytic functions.

Abstract

We define a certain Hecke theoretic notion of family of smooth admissible representations of $GL_n(F)$, or of products of such groups, where $F$ is a nonarchimedean local field of characteristic zero. While this notion of family is rather weak a priori, we show that it implies strong rigidity properties for the Bernstein-Zelevinsky presentations of the members of such families, as well as for the variation of their epsilon factors (attached to arbitrary functorial lifts). Examples of such families come often from the theory of eigenvarieties, and in this case our results imply analyticity properties for the epsilon factors of the members of these families.