Walsh equiconvergence of complex interpolating polynomials

Resource Information

The work Walsh equiconvergence of complex interpolating polynomials represents a distinct intellectual or artistic creation found in University of Missouri Libraries. This resource is a combination of several types including: Work, Language Material, Books.

Label

Walsh equiconvergence of complex interpolating polynomials

Statement of responsibility

by Amnon Jakimovski, Ambikeshwar Sharma and József Szabados

Creator

• Jakimovski, Amnon, 1925-

Contributor

• Sharma, A., (Ambikeshwar)
• Szabados, J

Subject

• Polynomials
• Polynomials
• Polynomials
• Polynomials
• Polynômes
• MATHEMATICS -- Algebra | Elementary

Language

eng

Summary

This book is a collection of the various old and new results, centered around the following simple and beautiful observation of J.L. Walsh - If a function is analytic in a finite disc, and not in a larger disc, then the difference between the Lagrange interpolant of the function, at the roots of unity, and the partial sums of the Taylor series, about the origin, tends to zero in a larger disc than the radius of convergence of the Taylor series, while each of these operators converges only in the original disc. This book will be particularly useful for researchers in approximation and interpolation theory

Member of

• Springer monographs in mathematics

Cataloging source

GW5XE

Dewey number

512.9422

Index

no index present

Language note

English

LC call number

QA161.P59

LC item number

J35 2006eb

Literary form

non fiction

Nature of contents

• dictionaries
• bibliography

Series statement

Springer monographs in mathematics