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调和分析与概率论/Harmonic analysis and the theory of probability

调和分析与概率论/Harmonic analysis and the theory of probability

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作者: Salomon Bochner 著

出版社: Oversea Publishing House

出版时间: 2005-08

版次: 1

ISBN: 9780486446202

定价: 117.07

装帧: 平装

开本: 其他

纸张: 胶版纸

页数: 176页

分类: 外文古旧书>英文书>工程技术

This classic text emphasizes the stochastic processes and the interchange of stimuli between probability and analysis. Non-probabilistic topics include Fourier series and integrals in many variables; the Bochner integral; and the transforms of Plancherel, Laplace, Poisson, and Mellin. Most notable is the systematic presentation of Bochner's characteristic functional. 1955 edition. Chapter 1. Approximations

  1.1. Approximation of functions at points

  1.2. Translation functions

  1.3. Approximation in norm

  1.4. Vector-valued functions

  1.5. Additive set functions

  1.6. Periodic additive set functions

Chapter 2. Fourier Expansions

  2.1. Fourier integrals

  2.2. Positive transforms. Plancherel transforms

  2.3. Fourier series

  2.4. Poisson summation formula

  2.5. Summability. Heat and Laplace equations

　2.6. Theta relations with spherical harmonics

  2.7. Expansions in spherical harmonics

  2.8. Zeta integrals

  2.9. Zeta series

Chapter 3. Closure Properties of Fourier Transforms

  3.1. Pseudo-characters and Poisson characters

  3.2. Pseudo-transforms and positive definite functions

  3.3. Poisson transforms

  3.4. Infinitely subdivisible processes

  3.5. Absolute moments

  3.6. Locally compact Abelian groups

  3.7. Random variables

  3.8. General positivity

Chapter 4. Laplace and Mellin Transforms

  4.1. Completely monotone functions in one variable

  4.2. Completely monotone functions in several variables

  4.3. Subordination of infinitely subdivisible processes

  4.4. Subordination of Markoff processes

  4.5. A theorem of Hardy, Littlewood and Paley

  4.6. Functions of the Laplace operator

  4.7. Multidimensional time variable

  4.8. Riemann's functional equation for zeta functions

  4.9. Summation formulas and Bessel functions in one and several variables

Chapter 5. Stochastic Processes and Characteristic functionals

  5.1. Directed sets of probability spaces

  5.2. Markoff processes

  5.3. Length of random paths in homogeneous spaces

  5.4. Euclidean stochastic processes and their charac-teristic functionals

  5.5. Random functions

  5.6. Generating functionals

Chapter 6. Analysis of Stochastic Processes

  6.1. Basic operations with characteristic funetionals

  6.2. Convergence in probability and integration

  6.3. Convergence in norm

  6.4. Expansion in series and integrals

  6.5. Stationarity and orthogonality

  6.6. Further statements

Notes and References

Indexes
内容简介:
This classic text emphasizes the stochastic processes and the interchange of stimuli between probability and analysis. Non-probabilistic topics include Fourier series and integrals in many variables; the Bochner integral; and the transforms of Plancherel, Laplace, Poisson, and Mellin. Most notable is the systematic presentation of Bochner's characteristic functional. 1955 edition.
目录:
Chapter 1. Approximations

  1.1. Approximation of functions at points

  1.2. Translation functions

  1.3. Approximation in norm

  1.4. Vector-valued functions

  1.5. Additive set functions

  1.6. Periodic additive set functions

Chapter 2. Fourier Expansions

  2.1. Fourier integrals

  2.2. Positive transforms. Plancherel transforms

  2.3. Fourier series

  2.4. Poisson summation formula

  2.5. Summability. Heat and Laplace equations

　2.6. Theta relations with spherical harmonics

  2.7. Expansions in spherical harmonics

  2.8. Zeta integrals

  2.9. Zeta series

Chapter 3. Closure Properties of Fourier Transforms

  3.1. Pseudo-characters and Poisson characters

  3.2. Pseudo-transforms and positive definite functions

  3.3. Poisson transforms

  3.4. Infinitely subdivisible processes

  3.5. Absolute moments

  3.6. Locally compact Abelian groups

  3.7. Random variables

  3.8. General positivity

Chapter 4. Laplace and Mellin Transforms

  4.1. Completely monotone functions in one variable

  4.2. Completely monotone functions in several variables

  4.3. Subordination of infinitely subdivisible processes

  4.4. Subordination of Markoff processes

  4.5. A theorem of Hardy, Littlewood and Paley

  4.6. Functions of the Laplace operator

  4.7. Multidimensional time variable

  4.8. Riemann's functional equation for zeta functions

  4.9. Summation formulas and Bessel functions in one and several variables

Chapter 5. Stochastic Processes and Characteristic functionals

  5.1. Directed sets of probability spaces

  5.2. Markoff processes

  5.3. Length of random paths in homogeneous spaces

  5.4. Euclidean stochastic processes and their charac-teristic functionals

  5.5. Random functions

  5.6. Generating functionals

Chapter 6. Analysis of Stochastic Processes

  6.1. Basic operations with characteristic funetionals

  6.2. Convergence in probability and integration

  6.3. Convergence in norm

  6.4. Expansion in series and integrals

  6.5. Stationarity and orthogonality

  6.6. Further statements

Notes and References

Indexes

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Harmonic Analysis and the Theory of Probability (Dover Books on Mathematics) 谐波分析与概率论 Salomon Bochner 书籍内容简介可联系客服查阅，查书找书开票同样可以联系客服

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