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On Central Critical Values of the Degree Four $L$-functions for $\mathrm{GSp}(4)$: The Fundamental Lemma
 
Masaaki Furusawa Osaka City University, Osaka, Japan
Joseph A. Shalika Johns Hopkins University, Baltimore, MD
On Central Critical Values of the Degree Four L-functions for GSp(4): The Fundamental Lemma
eBook ISBN:  978-1-4704-0380-5
Product Code:  MEMO/164/782.E
List Price: $65.00
MAA Member Price: $58.50
AMS Member Price: $39.00
On Central Critical Values of the Degree Four L-functions for GSp(4): The Fundamental Lemma
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On Central Critical Values of the Degree Four $L$-functions for $\mathrm{GSp}(4)$: The Fundamental Lemma
Masaaki Furusawa Osaka City University, Osaka, Japan
Joseph A. Shalika Johns Hopkins University, Baltimore, MD
eBook ISBN:  978-1-4704-0380-5
Product Code:  MEMO/164/782.E
List Price: $65.00
MAA Member Price: $58.50
AMS Member Price: $39.00
  • Book Details
     
     
    Memoirs of the American Mathematical Society
    Volume: 1642003; 139 pp
    MSC: Primary 11; Secondary 22

    In this paper we prove two equalities of local Kloosterman integrals on \(\mathrm{GSp}\left(4\right)\), the group of \(4\) by \(4\) symplectic similitude matrices. One is an equality between the Novodvorsky orbital integral and the Bessel orbital integral and the other one is an equality between the Bessel orbital integral and the quadratic orbital integral. We conjecture that both of Jacquet's relative trace formulas for the central critical values of the \(L\)-functions for \(\mathrm{gl}\left(2\right)\) in [{J1}] and [{J2}], where Jacquet has given another proof of Waldspurger's result [{W2}], generalize to the ones for the central critical values of the degree four spinor \(L\)-functions for \(\mathrm{GSp}\left(4\right)\). We believe that our approach will lead us to a proof and also a precise formulation of a conjecture of Böcherer [{B}] and its generalization. Support for this conjecture may be found in the important paper of Böcherer and Schulze-Pillot [{BSP}]. Also a numerical evidence has been recently given by Kohnen and Kuss [{KK}]. Our results serve as the fundamental lemmas for our conjectural relative trace formulas for the main relevant double cosets.

    Readership

    Graduate students and research mathematicians interested in number theory.

  • Table of Contents
     
     
    • Chapters
    • 1. Statement of results
    • 2. Gauss sum, Kloosterman sum and Salié sum
    • 3. Matrix argument Kloosterman sums
    • 4. Evaluation of the Novodvorsky orbital integral
    • 5. Evaluation of the Bessel orbital integral
    • 6. Evaluation of the quadratic orbital integral
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 1642003; 139 pp
MSC: Primary 11; Secondary 22

In this paper we prove two equalities of local Kloosterman integrals on \(\mathrm{GSp}\left(4\right)\), the group of \(4\) by \(4\) symplectic similitude matrices. One is an equality between the Novodvorsky orbital integral and the Bessel orbital integral and the other one is an equality between the Bessel orbital integral and the quadratic orbital integral. We conjecture that both of Jacquet's relative trace formulas for the central critical values of the \(L\)-functions for \(\mathrm{gl}\left(2\right)\) in [{J1}] and [{J2}], where Jacquet has given another proof of Waldspurger's result [{W2}], generalize to the ones for the central critical values of the degree four spinor \(L\)-functions for \(\mathrm{GSp}\left(4\right)\). We believe that our approach will lead us to a proof and also a precise formulation of a conjecture of Böcherer [{B}] and its generalization. Support for this conjecture may be found in the important paper of Böcherer and Schulze-Pillot [{BSP}]. Also a numerical evidence has been recently given by Kohnen and Kuss [{KK}]. Our results serve as the fundamental lemmas for our conjectural relative trace formulas for the main relevant double cosets.

Readership

Graduate students and research mathematicians interested in number theory.

  • Chapters
  • 1. Statement of results
  • 2. Gauss sum, Kloosterman sum and Salié sum
  • 3. Matrix argument Kloosterman sums
  • 4. Evaluation of the Novodvorsky orbital integral
  • 5. Evaluation of the Bessel orbital integral
  • 6. Evaluation of the quadratic orbital integral
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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