Concentration and Gaussian Approximation for Randomized Sums: Probability Theory and Stochastic Modelling, cartea 104
Autor Sergey Bobkov, Gennadiy Chistyakov, Friedrich Götzeen Limba Engleză Paperback – 18 mai 2024
While the first part of the book discusses the basic notions and results from probability and analysis which are needed for the remainder of the book, the latter parts provide a thorough exposition of concentration, analysis on the sphere, higher order normal approximation and classes of weighted sums of dependent random variables with and without symmetries.
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| Paperback (1) | 795.95 lei 38-44 zile | |
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| Springer Nature Switzerland – 18 mai 2023 | 941.91 lei 43-57 zile |
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Specificații
ISBN-13: 9783031311512
ISBN-10: 3031311515
Pagini: 434
Ilustrații: XVII, 434 p.
Dimensiuni: 155 x 235 mm
Ediția:2023
Editura: Springer Nature Switzerland
Colecția Springer
Seria Probability Theory and Stochastic Modelling
Locul publicării:Cham, Switzerland
ISBN-10: 3031311515
Pagini: 434
Ilustrații: XVII, 434 p.
Dimensiuni: 155 x 235 mm
Ediția:2023
Editura: Springer Nature Switzerland
Colecția Springer
Seria Probability Theory and Stochastic Modelling
Locul publicării:Cham, Switzerland
Cuprins
Part I. Generalities.- 1. Moments and correlation conditions.- 2. Some classes of probability distributions.- 3. Characteristic functions.- 4. Sums of independent random variables.- Part II. Selected topics on concentration.- 5. Standard analytic conditions.- 6. Poincaré-type inequalities.- 7. Logarithmic Sobolev inequalities.- 8. Supremum and infimum convolutions.- Part IV. Analysis on the sphere.- 9. Sobolev-type inequalities.- 10. Second order spherical concentration.- 11. Linear functionals on the sphere.- Part V. First applications to randomized sums.- 12. Typical distributions.- 13. Characteristic functions of weighted sums.- 14. Fluctuations of distributions.- Part VI. Refined bounds and rates.- 15. L^2 expansions and estimates.- 16. Refinements for the Kolmogorov distance.- 17. Applications of the second order correlation condition.- Part VII. Distributions and coefficients of special types.- 18. Special systems and examples.- 19. Distributions with symmetries.- 20. Productmeasures.- 21. Coefficients of Special type.- Glossary.
Notă biografică
Textul de pe ultima copertă
This book describes extensions of Sudakov's classical result on the concentration of measure phenomenon for weighted sums of dependent random variables. The central topics of the book are weighted sums of random variables and the concentration of their distributions around Gaussian laws. The analysis takes place within the broader context of concentration of measure for functions on high-dimensional spheres. Starting from the usual concentration of Lipschitz functions around their limiting mean, the authors proceed to derive concentration around limiting affine or polynomial functions, aiming towards a theory of higher order concentration based on functional inequalities of log-Sobolev and Poincaré type. These results make it possible to derive concentration of higher order for weighted sums of classes of dependent variables.
While the first part of the book discusses the basic notions and results from probability and analysis which are needed for the remainder of the book, thelatter parts provide a thorough exposition of concentration, analysis on the sphere, higher order normal approximation and classes of weighted sums of dependent random variables with and without symmetries.
While the first part of the book discusses the basic notions and results from probability and analysis which are needed for the remainder of the book, thelatter parts provide a thorough exposition of concentration, analysis on the sphere, higher order normal approximation and classes of weighted sums of dependent random variables with and without symmetries.
Caracteristici
Self-contained book on extensions of Sudakov's theorem Discusses weighted sums of random variables and the concentration of their distributions around Gaussian laws Contains a detailed exposition of the concentration of measure phenomenon on the unit sphere