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Walsh Equiconvergence of Complex Interpolating Polynomials

(Sprache: Englisch)
Autoren: Amnon Jakimovski , Ambikeshwar Sharma , József Szabados

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Walsh Equiconvergence of Complex Interpolating Polynomials, Amnon Jakimovski, Ambikeshwar Sharma, József Szabados
 
1) but not in z ? ?, then the di?erence between the Lagrange interpolant to it th in the n roots of unity and the partial sums of degree n? 1 of the Taylor 2 series about the origin, tends to zero in a larger disc of radius ? , although both operators converge to f(z) only for z
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1) but not in z ? ?, then the di?erence between the Lagrange interpolant to it th in the n roots of unity and the partial sums of degree n? 1 of the Taylor 2 series about the origin, tends to zero in a larger disc of radius ? , although both operators converge to f(z) only for z
Inhaltsverzeichnis zu „Walsh Equiconvergence of Complex Interpolating Polynomials “
- Dedication
- Preface
- Lagrange Interpolation and Walsh Equiconvergence
- Hermite and Hermite-Birkhoff Interpolation and Walsh Equiconvergence
- A generalization of the Taylor Series to Rational Functions and Walsh Equiconvergence
- Sharpness Results
- Converse Results
- Padé Approximation and Walsh Equiconvergence for Meromorphic Functions with v-Poles
- Quantitative Results in the Equiconvergence of Approximation of Meromorphic Functions
- Equiconvergence for Functions Analytic in an Ellipse
- Walsh Equiconvergence Theorems for the Faber Series
- Equiconvergence on Lemniscates
- Walsh Equiconvergence and Summability
- References
Bibliographische Angaben
Sprache:
Englisch
Rezension zu „Walsh Equiconvergence of Complex Interpolating Polynomials “

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