Derived Jacquet-Emerton Module Functor

Lee, Hao

doi:10.6082/uchicago.5724

Published March 2023 | Version v1

Dissertation Open

Derived Jacquet-Emerton Module Functor

Lee, Hao¹

1. University of Chicago

Contributors

Advisor:

Emerton, Matthew

Committee member:

Calegari, Frank

Let G be a p-adic Lie group associated to associated to a connected reductive group over Qp. Let P be a parabolic subgroup of G and let M be a Levi quotient of P. In this paper, we define a delta-functor H^*J_P from the category of admissible locally analytic G-representations to the category of essentially admissible locally analytic M-representations that extends the Jacquet-Emerton module functor J_{P}.

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Other: oai:uchicago.tind.io:5724

Division(s): Physical Sciences Division
Department(s): Mathematics

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DOI

Resource type

Dissertation

Publisher

University of Chicago

Thesis

Ph.D.

Languages

English

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73 pages

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Creative Commons Attribution 4.0 International

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Technical metadata

Created: May 22, 2026
Modified: May 22, 2026

Derived Jacquet-Emerton Module Functor

Contributors

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Committee member:

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Lee_uchicago_0330D_16768.pdf

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UChicago Information

Derived Jacquet-Emerton Module Functor

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Contributors

Advisor:

Committee member:

Description

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Lee_uchicago_0330D_16768.pdf

Files (515.2 kB)

Additional details

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UChicago Information