Author : Vladislav K. Dzyadyk
Publisher : Walter de Gruyter
Page : 497 pages
File Size : 28,12 MB
Release : 2008-09-25
Category : Mathematics
ISBN : 3110208245
A thorough, self-contained and easily accessible treatment of the theory on the polynomial best approximation of functions with respect to maximum norms. The topics include Chebychev theory, Weierstraß theorems, smoothness of functions, and continuation of functions.
Author : A. F. Timan
Publisher : Elsevier
Page : 644 pages
File Size : 10,59 MB
Release : 2014-07-22
Category : Mathematics
ISBN : 1483184811
Theory of Approximation of Functions of a Real Variable discusses a number of fundamental parts of the modern theory of approximation of functions of a real variable. The material is grouped around the problem of the connection between the best approximation of functions to their structural properties. This text is composed of eight chapters that highlight the relationship between the various structural properties of real functions and the character of possible approximations to them by polynomials and other functions of simple construction. Each chapter concludes with a section containing various problems and theorems, which supplement the main text. The first chapters tackle the Weierstrass's theorem, the best approximation by polynomials on a finite segment, and some compact classes of functions and their structural properties. The subsequent chapters describe some properties of algebraic polynomials and transcendental integral functions of exponential type, as well as the direct theorems of the constructive theory of functions. These topics are followed by discussions of differential and constructive characteristics of converse theorems. The final chapters explore other theorems connecting the best approximations functions with their structural properties. These chapters also deal with the linear processes of approximation of functions by polynomials. The book is intended for post-graduate students and for mathematical students taking advanced courses, as well as to workers in the field of the theory of functions.
Author : H N Mhaskar
Publisher : World Scientific
Page : 398 pages
File Size : 46,59 MB
Release : 1997-01-04
Category : Mathematics
ISBN : 9814518050
In this book, we have attempted to explain a variety of different techniques and ideas which have contributed to this subject in its course of successive refinements during the last 25 years. There are other books and surveys reviewing the ideas from the perspective of either potential theory or orthogonal polynomials. The main thrust of this book is to introduce the subject from an approximation theory point of view. Thus, the main motivation is to study analogues of results from classical trigonometric approximation theory, introducing other ideas as needed. It is not our objective to survey the most recent results, but merely to introduce to the readers the thought processes and ideas as they are developed.This book is intended to be self-contained, although the reader is expected to be familiar with rudimentary real and complex analysis. It will also help to have studied elementary trigonometric approximation theory, and have some exposure to orthogonal polynomials.
Author : Theodore J. Rivlin
Publisher : Courier Corporation
Page : 164 pages
File Size : 32,36 MB
Release : 1981-01-01
Category : Mathematics
ISBN : 9780486640693
Mathematics of Computing -- Numerical Analysis.
Author : Carl De Boor
Publisher : American Mathematical Soc.
Page : 145 pages
File Size : 14,12 MB
Release : 1986
Category : Mathematics
ISBN : 0821800981
Presented at a 1986 AMS Short Course, this title contains papers that give a brief introduction to approximation theory and some of its areas of active research, both theoretical and applied. It is best understood by those with a standard first graduate course in real and complex analysis.
Author : Alexander I. Stepanets
Publisher : Walter de Gruyter GmbH & Co KG
Page : 496 pages
File Size : 19,26 MB
Release : 2018-11-05
Category : Mathematics
ISBN : 3110926032
The theory of approximation of functions is one of the central branches in mathematical analysis and has been developed over a number of decades. This monograph deals with a series of problems related to one of the directions of the theory, namely, the approximation of periodic functions by trigonometric polynomials generated by linear methods of summation of Fourier series. More specific, the following linear methods are investigated: classical methods of Fourier, Fejir, Riesz, and Roginski. For these methods the so-called Kolmogorov-Nikol'skii problem is considered, which consists of finding exact and asymptotically exact qualities for the upper bounds of deviations of polynomials generated by given linear methods on given classes of 2?-periodic functions. Much attention is also given to the multidimensional case. The material presented in this monograph did not lose its importance since the publication of the Russian edition (1981). Moreover, new material has been added and several corrections were made. In this field of mathematics numerous deep results were obtained, many important and complicated problems were solved, and new methods were developed, which can be extremely useful for many mathematicians. All principle problems considered in this monograph are given in the final form, i.e. in the form of exact asymptotic equalities, and, therefore, retain their importance and interest for a long time.
Author : G. G. Lorentz
Publisher : American Mathematical Society
Page : 200 pages
File Size : 42,17 MB
Release : 2023-05-08
Category : Mathematics
ISBN : 1470474948
This is an easily accessible account of the approximation of functions. It is simple and without unnecessary details, but complete enough to include the classical results of the theory. With only a few exceptions, only functions of one real variable are considered. A major theme is the degree of uniform approximation by linear sets of functions. This encompasses approximations by trigonometric polynomials, algebraic polynomials, rational functions, and polynomial operators. The chapter on approximation by operators does not assume extensive knowledge of functional analysis. Two chapters cover the important topics of widths and entropy. The last chapter covers the solution by Kolmogorov and Arnol?d of Hilbert's 13th problem. There are notes at the end of each chapter that give information about important topics not treated in the main text. Each chapter also has a short set of challenging problems, which serve as illustrations.
Author : Isidor Pavlovich Natanson
Publisher :
Page : 252 pages
File Size : 27,96 MB
Release : 1964
Category : Functions
ISBN :
Author : Frederick James Schuurmann
Publisher :
Page : 212 pages
File Size : 46,90 MB
Release : 1967
Category : Functions
ISBN :
Author : Elliott Ward Cheney
Publisher : Chelsea Publishing Company, Incorporated
Page : 280 pages
File Size : 19,98 MB
Release : 1982
Category : Mathematics
ISBN :
