Spherical pairs over close local fields

Avraham Aizenbud; Nir Avni; Dmitry Gourevitch

doi:10.4171/CMH/274

Spherical pairs over close local fields

Department of Mathematics

Weizmann Institute of Science

Research output: Contribution to journal › Article › peer-review

Abstract

Extending results of [Kaz86] to the relative case, we relate harmonic analysis over some spherical spaces G.(F)/H.(F), where F is a field of positive characteristic, to harmonic analysis over the spherical spaces G.(E)=H.(E), where E is a suitably chosen field of characteristic 0. We apply our results to show that the pair .(GLnC1.F ); GL _n.(F)) is a strong Gelfand pair for all local fields of arbitrary characteristic, and that the pair .GL _nCk.(F); GL _n.(F)̃GLk.(F)) is a Gelfand pair for local fields of any characteristic different from 2. We also give a criterion for finite generation of the space of K-invariant compactly supported functions on G.E/=H.E/ as a module over the Hecke algebra.

Original language	English
Pages (from-to)	929-962
Number of pages	34
Journal	Commentarii Mathematici Helvetici
Volume	87
Issue number	4
DOIs	https://doi.org/10.4171/CMH/274
State	Published - 2012

ASJC Scopus subject areas

General Mathematics

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title = "Spherical pairs over close local fields",

abstract = "Extending results of [Kaz86] to the relative case, we relate harmonic analysis over some spherical spaces G.(F)/H.(F), where F is a field of positive characteristic, to harmonic analysis over the spherical spaces G.(E)=H.(E), where E is a suitably chosen field of characteristic 0. We apply our results to show that the pair .(GLnC1.F ); GL n.(F)) is a strong Gelfand pair for all local fields of arbitrary characteristic, and that the pair .GL nCk.(F); GL n.(F{\~)}GLk.(F)) is a Gelfand pair for local fields of any characteristic different from 2. We also give a criterion for finite generation of the space of K-invariant compactly supported functions on G.E/=H.E/ as a module over the Hecke algebra.",

author = "Avraham Aizenbud and Nir Avni and Dmitry Gourevitch",

note = "BSF grant; GIF grant; ISF Center of excellency grant; ISF grant [583/09]; NSF grant [DMS-0901638, DMS-0635607]A.A. was supported by a BSF grant, a GIF grant, an ISF Center of excellency grant and ISF grant No. 583/09. N.A. was supported by NSF grant DMS-0901638. D.G. was supported by NSF grant DMS-0635607. Any opinions, findings and conclusions or recommendations expressed in this material are those of the authors and do not necessarily reflect the views of the National Science Foundation.",

year = "2012",

doi = "10.4171/CMH/274",

language = "الإنجليزيّة",

volume = "87",

pages = "929--962",

journal = "Commentarii Mathematici Helvetici",

issn = "0010-2571",

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T1 - Spherical pairs over close local fields

AU - Aizenbud, Avraham

AU - Avni, Nir

AU - Gourevitch, Dmitry

N1 - BSF grant; GIF grant; ISF Center of excellency grant; ISF grant [583/09]; NSF grant [DMS-0901638, DMS-0635607]A.A. was supported by a BSF grant, a GIF grant, an ISF Center of excellency grant and ISF grant No. 583/09. N.A. was supported by NSF grant DMS-0901638. D.G. was supported by NSF grant DMS-0635607. Any opinions, findings and conclusions or recommendations expressed in this material are those of the authors and do not necessarily reflect the views of the National Science Foundation.

PY - 2012

Y1 - 2012

N2 - Extending results of [Kaz86] to the relative case, we relate harmonic analysis over some spherical spaces G.(F)/H.(F), where F is a field of positive characteristic, to harmonic analysis over the spherical spaces G.(E)=H.(E), where E is a suitably chosen field of characteristic 0. We apply our results to show that the pair .(GLnC1.F ); GL n.(F)) is a strong Gelfand pair for all local fields of arbitrary characteristic, and that the pair .GL nCk.(F); GL n.(F)̃GLk.(F)) is a Gelfand pair for local fields of any characteristic different from 2. We also give a criterion for finite generation of the space of K-invariant compactly supported functions on G.E/=H.E/ as a module over the Hecke algebra.

AB - Extending results of [Kaz86] to the relative case, we relate harmonic analysis over some spherical spaces G.(F)/H.(F), where F is a field of positive characteristic, to harmonic analysis over the spherical spaces G.(E)=H.(E), where E is a suitably chosen field of characteristic 0. We apply our results to show that the pair .(GLnC1.F ); GL n.(F)) is a strong Gelfand pair for all local fields of arbitrary characteristic, and that the pair .GL nCk.(F); GL n.(F)̃GLk.(F)) is a Gelfand pair for local fields of any characteristic different from 2. We also give a criterion for finite generation of the space of K-invariant compactly supported functions on G.E/=H.E/ as a module over the Hecke algebra.

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DO - 10.4171/CMH/274

M3 - مقالة

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JO - Commentarii Mathematici Helvetici

JF - Commentarii Mathematici Helvetici

IS - 4

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Spherical pairs over close local fields

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