Representation zeta functions of compact p-adic analytic groups and arithmetic groups
Representation zeta functions of compact p-adic analytic groups and arithmetic groups
We introduce new methods from p-adic integration into the study of representation zeta functions associated to compact p-adic analytic groups and arithmetic groups. They allow us to establish that the representation zeta functions of generic members of families of p-adic analytic pro-p groups obtained from a global, `perfect' Lie lattice satisfy functional equations. In the case of `semisimple' compact p-adic analytic groups, we exhibit a link between the relevant p-adic integrals and a natural filtration of the locus of irregular elements in the associated semisimple Lie algebra, defined by centraliser dimension.
Based on this algebro-geometric description, we compute explicit formulae for the representation zeta functions of principal congruence subgroups of the groups SL_3(O), where O is a compact discrete valuation ring of characteristic 0, and of the corresponding unitary groups. These formulae, combined with approximative Clifford theory, allow us to determine the abscissae of convergence of representation zeta functions associated to arithmetic subgroups of algebraic groups of type A_2. Assuming a conjecture of Serre on the Congruence Subgroup Problem, we thereby prove a conjecture of Larsen and Lubotzky on lattices in higher-rank semisimple groups for algebraic groups of type A_2 defined over number fields.
111-197
Avni, Nir
6f0719d5-4bce-4d71-b312-33a9cea6b36f
Klopsch, Benjamin
3556ffc9-0748-4eee-aecc-d1dc70a30638
Onn, Uri
47e1ca18-b0f2-4cd9-b857-2f6cb1a5f071
Voll, Christopher
b7bd2890-38ac-4e05-adb7-3b376916ff79
2013
Avni, Nir
6f0719d5-4bce-4d71-b312-33a9cea6b36f
Klopsch, Benjamin
3556ffc9-0748-4eee-aecc-d1dc70a30638
Onn, Uri
47e1ca18-b0f2-4cd9-b857-2f6cb1a5f071
Voll, Christopher
b7bd2890-38ac-4e05-adb7-3b376916ff79
Avni, Nir, Klopsch, Benjamin, Onn, Uri and Voll, Christopher
(2013)
Representation zeta functions of compact p-adic analytic groups and arithmetic groups.
Duke Mathematical Journal, 162 (1), .
(doi:10.1215/00127094-1959198).
Abstract
We introduce new methods from p-adic integration into the study of representation zeta functions associated to compact p-adic analytic groups and arithmetic groups. They allow us to establish that the representation zeta functions of generic members of families of p-adic analytic pro-p groups obtained from a global, `perfect' Lie lattice satisfy functional equations. In the case of `semisimple' compact p-adic analytic groups, we exhibit a link between the relevant p-adic integrals and a natural filtration of the locus of irregular elements in the associated semisimple Lie algebra, defined by centraliser dimension.
Based on this algebro-geometric description, we compute explicit formulae for the representation zeta functions of principal congruence subgroups of the groups SL_3(O), where O is a compact discrete valuation ring of characteristic 0, and of the corresponding unitary groups. These formulae, combined with approximative Clifford theory, allow us to determine the abscissae of convergence of representation zeta functions associated to arithmetic subgroups of algebraic groups of type A_2. Assuming a conjecture of Serre on the Congruence Subgroup Problem, we thereby prove a conjecture of Larsen and Lubotzky on lattices in higher-rank semisimple groups for algebraic groups of type A_2 defined over number fields.
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AKOV1_20100714CV.pdf
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Submitted date: 15 July 2010
e-pub ahead of print date: 2010
Published date: 2013
Organisations:
Pure Mathematics
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Local EPrints ID: 160815
URI: http://eprints.soton.ac.uk/id/eprint/160815
ISSN: 0012-7094
PURE UUID: e3fb1212-072f-4fc2-b314-70749bd5e1eb
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Date deposited: 21 Jul 2010 07:44
Last modified: 14 Mar 2024 01:58
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Author:
Nir Avni
Author:
Benjamin Klopsch
Author:
Uri Onn
Author:
Christopher Voll
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