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The Schrödinger Model for the Minimal Representation of the Indefinite Orthogonal Group $O(p,q)$
 
Toshiyuki Kobayashi University of Tokyo, Tokyo, Japan
Gen Mano PricewaterhouseCoopers Aarata, Tokyo, Japan
The Schrodinger Model for the Minimal Representation of the Indefinite Orthogonal Group O(p,q)
eBook ISBN:  978-1-4704-0617-2
Product Code:  MEMO/213/1000.E
List Price: $75.00
MAA Member Price: $67.50
AMS Member Price: $45.00
The Schrodinger Model for the Minimal Representation of the Indefinite Orthogonal Group O(p,q)
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The Schrödinger Model for the Minimal Representation of the Indefinite Orthogonal Group $O(p,q)$
Toshiyuki Kobayashi University of Tokyo, Tokyo, Japan
Gen Mano PricewaterhouseCoopers Aarata, Tokyo, Japan
eBook ISBN:  978-1-4704-0617-2
Product Code:  MEMO/213/1000.E
List Price: $75.00
MAA Member Price: $67.50
AMS Member Price: $45.00
  • Book Details
     
     
    Memoirs of the American Mathematical Society
    Volume: 2132011; 132 pp
    MSC: Primary 22; Secondary 43

    The authors introduce a generalization of the Fourier transform, denoted by \(\mathcal{F}_C\), on the isotropic cone \(C\) associated to an indefinite quadratic form of signature \((n_1,n_2)\) on \(\mathbb{R}^n\) (\(n=n_1+n_2\): even). This transform is in some sense the unique and natural unitary operator on \(L^2(C)\), as is the case with the Euclidean Fourier transform \(\mathcal{F}_{\mathbb{R}^n}\) on \(L^2(\mathbb{R}^n)\). Inspired by recent developments of algebraic representation theory of reductive groups, the authors shed new light on classical analysis on the one hand, and give the global formulas for the \(L^2\)-model of the minimal representation of the simple Lie group \(G=O(n_1+1,n_2+1)\) on the other hand.

  • Table of Contents
     
     
    • Chapters
    • 1. Introduction
    • 2. Two models of the minimal representation of $O(p,q)$
    • 3. $K$-finite eigenvectors in the Schrödinger model $L^2(C)$
    • 4. Radial part of the inversion
    • 5. Main theorem
    • 6. Bessel distributions
    • 7. Appendix: special functions
  • 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: 2132011; 132 pp
MSC: Primary 22; Secondary 43

The authors introduce a generalization of the Fourier transform, denoted by \(\mathcal{F}_C\), on the isotropic cone \(C\) associated to an indefinite quadratic form of signature \((n_1,n_2)\) on \(\mathbb{R}^n\) (\(n=n_1+n_2\): even). This transform is in some sense the unique and natural unitary operator on \(L^2(C)\), as is the case with the Euclidean Fourier transform \(\mathcal{F}_{\mathbb{R}^n}\) on \(L^2(\mathbb{R}^n)\). Inspired by recent developments of algebraic representation theory of reductive groups, the authors shed new light on classical analysis on the one hand, and give the global formulas for the \(L^2\)-model of the minimal representation of the simple Lie group \(G=O(n_1+1,n_2+1)\) on the other hand.

  • Chapters
  • 1. Introduction
  • 2. Two models of the minimal representation of $O(p,q)$
  • 3. $K$-finite eigenvectors in the Schrödinger model $L^2(C)$
  • 4. Radial part of the inversion
  • 5. Main theorem
  • 6. Bessel distributions
  • 7. Appendix: special functions
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
Please select which format for which you are requesting permissions.