Blaschke products and optimal recovery in H ∞

N. Dyn; C. A. Micchelli; T. J. Rivlin

doi:10.1007/BF02576413

Blaschke products and optimal recovery in H^∞

N. Dyn^*, C. A. Micchelli, T. J. Rivlin

^*Corresponding author for this work

School of Mathematical Sciences

Research output: Contribution to journal › Article › peer-review

Abstract

We examine the error in the optimal estimation of ∫_-1¹ f(t)w(t)dt by a quadrature formula using values of f at equally spaced points of (-1, 1) or at the zeros of ultraspherical polynomials. Here f is known to be an analytic function in the unit disc which is bounded by l and w is a given weight function with prescribed behavior near ±1. A major role in our investigations is played by bounds on (-1, 1) from above and below for the finite Blaschke product which is based in the nodes of the quadrature formula. Optimal estimation of the function f, rather than its integral, is also studied.

Original language	English
Pages (from-to)	1-21
Number of pages	21
Journal	Calcolo
Volume	24
Issue number	1
DOIs	https://doi.org/10.1007/BF02576413
State	Published - Mar 1987

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abstract = "We examine the error in the optimal estimation of ∫ -1 1 f(t)w(t)dt by a quadrature formula using values of f at equally spaced points of (-1, 1) or at the zeros of ultraspherical polynomials. Here f is known to be an analytic function in the unit disc which is bounded by l and w is a given weight function with prescribed behavior near ±1. A major role in our investigations is played by bounds on (-1, 1) from above and below for the finite Blaschke product which is based in the nodes of the quadrature formula. Optimal estimation of the function f, rather than its integral, is also studied.",

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Blaschke products and optimal recovery in H^∞

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