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On Ginzburg–Kaplan
gamma factors and Bessel–Speh functions for finite general
linear groups
Oded Carmon and Elad Zelingher |
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Vol. 8 (2026), No. 1, 59–108
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Abstract |
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We give a new construction of tensor product gamma factors for a pair of irreducible representations of and . This construction is a finite field analog of a construction of doubling type due to Kaplan in the local field case and due to Ginzburg in the global case, and it only assumes that one of the representations in question is generic. We use this construction to establish a relation between special values of Bessel functions attached to Speh representations of generic principal series representations and twisted matrix Kloosterman sums. Using this relation, we establish the multiplicativity identity of twisted matrix Kloosterman sums. |
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Keywords
representation theory, Speh representations, $(k,c)_{\psi}$
models, matrix Kloosterman sums, degenerate Whittaker
models, Bessel functions
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Mathematical Subject Classification
Primary: 11L05, 11T24, 20C33
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Milestones
Received: 2 January 2025
Revised: 6 May 2025
Accepted: 11 June 2025
Published: 13 January 2026
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Authors |
| Oded Carmon | |
| Faculty of Mathematics and Computer
Science The Weizmann Institute of Science Rehovot Israel |
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| Elad Zelingher | |
| Department of Mathematics University of Michigan Ann Arbor, MI United States |
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| © 2026 MSP (Mathematical Sciences Publishers). |
