\(L^2\)-approximations of power and logarithmic functions with applications to numerical conformal mapping (Q1601754)
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scientific article; zbMATH DE number 1761087
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(L^2\)-approximations of power and logarithmic functions with applications to numerical conformal mapping |
scientific article; zbMATH DE number 1761087 |
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\(L^2\)-approximations of power and logarithmic functions with applications to numerical conformal mapping (English)
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27 June 2002
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Let \(G\) be a region bounded by a quasiconformal curve \(L\) without cusps and let \((z-\tau)^\beta\) be of the form \(\beta> -1\) and \(\tau\in L\). The authors study the rate of approximation of such functions by polynomials as well as of \((z-\tau)^\beta [\log(z- \tau)]\)? A generalized Andrievski lemma is also proved and used. Consequences are also proved in the area of generalized Bieberbach polynomials.
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