Hypoelliptic Laplacian and Orbital Integrals

Name: Hypoelliptic Laplacian and Orbital Integrals
Brand: Princeton University Press
SKU: 9780691151304
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A01=Jean-Michel Bismut

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Asymptote

Atiyah–Singer index theorem

Author_Jean-Michel Bismut

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Automorphism

Bilinear form

Brownian motion

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Clifford algebra

Coefficient

Commutator

Computation

Connection form

Coordinate system

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Covariant derivative

De Rham cohomology

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Derivative

Determinant

Differential equation

Differential operator

Dimension (vector space)

Dirac operator

Division by zero

Dot product

Eigenvalues and eigenvectors

Endomorphism

eq_isMigrated=2

Equation

Estimation

Euclidean space

Existential quantification

Explicit formula

Explicit formulae (L-function)

Exponential function

Feynman–Kac formula

Fiber bundle

Fourier transform

Gaussian integral

Geodesic

Heat kernel

Hilbert space

Hypoelliptic operator

Integration by parts

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Levi-Civita connection

Lie algebra

Malliavin calculus

Orthonormal basis

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Parallel transport

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Polynomial

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Probability

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Pseudo-differential operator

Riemannian manifold

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Self-adjoint

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Symmetric bilinear form

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Product details

ISBN 9780691151304
Weight: 482g
Dimensions: 152 x 235mm
Publication Date: 28 Aug 2011
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback
Language: English

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This book uses the hypoelliptic Laplacian to evaluate semisimple orbital integrals in a formalism that unifies index theory and the trace formula. The hypoelliptic Laplacian is a family of operators that is supposed to interpolate between the ordinary Laplacian and the geodesic flow. It is essentially the weighted sum of a harmonic oscillator along the fiber of the tangent bundle, and of the generator of the geodesic flow. In this book, semisimple orbital integrals associated with the heat kernel of the Casimir operator are shown to be invariant under a suitable hypoelliptic deformation, which is constructed using the Dirac operator of Kostant. Their explicit evaluation is obtained by localization on geodesics in the symmetric space, in a formula closely related to the Atiyah-Bott fixed point formulas. Orbital integrals associated with the wave kernel are also computed. Estimates on the hypoelliptic heat kernel play a key role in the proofs, and are obtained by combining analytic, geometric, and probabilistic techniques. Analytic techniques emphasize the wavelike aspects of the hypoelliptic heat kernel, while geometrical considerations are needed to obtain proper control of the hypoelliptic heat kernel, especially in the localization process near the geodesics. Probabilistic techniques are especially relevant, because underlying the hypoelliptic deformation is a deformation of dynamical systems on the symmetric space, which interpolates between Brownian motion and the geodesic flow. The Malliavin calculus is used at critical stages of the proof.

Jean-Michel Bismut is professor of mathematics at the Universite Paris-Sud, Orsay.