Tauberian theory : a century of developments
Material type:
TextPublication details: Berlin Springer 2004Description: xv, 483 p : illISBN: 354021058X (acidfree paper)Subject(s): Tauberian theorems | Summability theory | Hardy-Littlewood methodDDC classification: 515.24 Online resources: Not Available | Not Available | Not Available Summary: Tauberian theory compares summability methods for series and integrals, helps to decide when there is convergence, and provides asymptotic and remainder estimates. The author shows the development of the theory from the beginning and his expert commentary evokes the excitement surrounding the early results. He shows the fascination of the difficult Hardy-Littlewood theorems and of an unexpected simple proof, and extolls Wiener's breakthrough based on Fourier theory. There are the spectacular "high-indices" theorems and Karamata's "regular variation", which permeates probability theory. The author presents Gelfand's elegant algebraic treatment of Wiener theory and his own distributional approach. There is also a new unified theory for Borel and "circle" methods. The text describes many Tauberian ways to the prime number theorem. A large bibliography and a substantial index round out the book
| Item type | Current library | Collection | Call number | Status | Date due | Barcode |
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Stack | Stack | 515.24 KOR/T (Browse shelf (Opens below)) | Available | 59443 |
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| 515.15 THO/C Calculus and analytic geometry / | 515.15 THO/C Calculas | 515.15 THO/C Calculas | 515.24 KOR/T Tauberian theory : a century of developments | 515.2422 MUS/C Classical and multilinear harmonic analysis | 515.2422 MUS/C Classical and multilinear harmonic analysis | 515.243 3 GRA/M Modern Fourier analysis |
Tauberian theory compares summability methods for series and integrals, helps to decide when there is convergence, and provides asymptotic and remainder estimates. The author shows the development of the theory from the beginning and his expert commentary evokes the excitement surrounding the early results. He shows the fascination of the difficult Hardy-Littlewood theorems and of an unexpected simple proof, and extolls Wiener's breakthrough based on Fourier theory. There are the spectacular "high-indices" theorems and Karamata's "regular variation", which permeates probability theory. The author presents Gelfand's elegant algebraic treatment of Wiener theory and his own distributional approach. There is also a new unified theory for Borel and "circle" methods. The text describes many Tauberian ways to the prime number theorem. A large bibliography and a substantial index round out the book
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