Approximation methods in probability theory / Vydas Cekanavicius.
Material type:
TextSeries: UniversitextPublication details: Switzerland : Springer, 2016.Description: xii, 274 pages : illustrations ; 24 cmISBN: - 9783319340715
- 511.4 23 C391
| Item type | Current library | Call number | Status | Date due | Barcode | Item holds | |
|---|---|---|---|---|---|---|---|
| Books | ISI Library, Kolkata | 511.4 C391 (Browse shelf(Opens below)) | Available | 137687 |
Browsing ISI Library, Kolkata shelves Close shelf browser (Hides shelf browser)
| No cover image available | No cover image available | |||||||
| 511.4 B445 Methods in approximation | 511.4 B511 Iterative approximation of fixed points | 511.4 B814 Approximation of free-discontinuity problems | 511.4 C391 Approximation methods in probability theory / | 511.4 C569 Approximation theory | 511.4 C748 Pade and rational approximation | 511.4 C748 Numerical methods of approximation theory |
Includes bibliographical references and index.
1. Definitions and preliminary facts.-
2. The method of convolutions.-
3. Local lattice estimates.-
4. Uniform lattice estimates.-
5. Total variation of lattice measures.-
6. Non-uniform estimates for lattice measures.-
7. Discrete non-lattice approximations.-
8. Absolutely continuous approximations.-
9. The Esseen type estimates.-
10. Lower estimates.-
11. The Stein method.-
12. The triangle function method.-
13. Heinrich's method for m-dependent variables.-
14. Other methods.-
Solutions to selected problems.-
Bibliography.-
Index.
This book presents a wide range of well-known and less common methods used for estimating the accuracy of probabilistic approximations, including the Esseen type inversion formulas, the Stein method as well as the methods of convolutions and triangle function. Emphasising the correct usage of the methods presented, each step required for the proofs is examined in detail. As a result, this textbook provides valuable tools for proving approximation theorems.
While Approximation Methods in Probability Theory will appeal to everyone interested in limit theorems of probability theory, the book is particularly aimed at graduate students who have completed a standard intermediate course in probability theory. Furthermore, experienced researchers wanting to enlarge their toolkit will also find this book useful.
There are no comments on this title.
