Near-Circularity in Capacity and Maximally Convergent Polynomials

If f is a power series with radius R of convergence, $$R > 1$$ R > 1 , it is well-known that the method of Carathéodory–Fejér constructs polynomial approximations of f on the closed unit disk which show the typical phenomenon of near-circularity on the unit circle. Let E be compact and connect...

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Vydáno v:Computational methods and function theory Ročník 25; číslo 2; s. 279 - 300
Hlavní autor: Blatt, Hans-Peter
Médium: Journal Article
Jazyk:angličtina
Vydáno: Heidelberg Springer Nature B.V 01.06.2025
Témata:
Approximation
Circularity
Convergence
Equilibrium
Error functions
Green's functions
Polynomials
Power series
Winding
ISSN:1617-9447, 2195-3724
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Shrnutí:If f is a power series with radius R of convergence, $$R > 1$$ R > 1 , it is well-known that the method of Carathéodory–Fejér constructs polynomial approximations of f on the closed unit disk which show the typical phenomenon of near-circularity on the unit circle. Let E be compact and connected and let f be holomorphic on E . If $$\left\{ p_n\right\} _{n\in \mathbb {N}}$$ p n n ∈ N is a sequence of polynomials converging maximally to f on E , it is shown that the modulus of the error functions $$f-p_n$$ f - p n is asymptotically constant in capacity on level lines of the Green’s function $$g_\Omega (z,\infty )$$ g Ω ( z , ∞ ) of the complement $$\Omega $$ Ω of E in $$\overline{\mathbb {C}}$$ C ¯ with pole at infinity, thereby reflecting a type of near-circularity, but without gaining knowledge of the winding numbers of the error curves with respect to the point 0.
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ISSN:1617-9447
2195-3724
DOI:10.1007/s40315-024-00528-5