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JOURNALS // Zapiski Nauchnykh Seminarov POMI // Archive

Zap. Nauchn. Sem. POMI, 2004 Volume 314, Pages 257–271 (Mi znsl760)

This article is cited in 2 papers

A converse approximation theorem on subsets of elliptic curves

A. V. Khaustov, N. A. Shirokov

Saint-Petersburg State University

Abstract: Functions defined on closed subsets of elliptic curves $G\subset E=\{(\zeta,w)\in\mathbb C^2:w^2=4\zeta^3-g_2\zeta-g_3\}$ are considered. The following converse theorem of approximation is established. Consider a function $f\colon G\to\mathbb C$. Assume that there is a sequence of polynomials $P_n(\zeta, w)$, in two variables, $\deg{P_n}\leqslant n$, such that the following inequalities are valid:
$$ |f(\zeta,w)-P_n(\zeta,w)|\leqslant c(f,G)\delta^\alpha_{1/n}(\zeta,w)\quad\text{при}\quad(\zeta,w)\in\partial G, $$
where $0<\alpha<1$. Then the function $f$ necessarily belongs to the class $H^\alpha(G)$. The direct approximation theorem was proved in the previous paper by the authors. Thus, a constructive description of the class $H^\alpha(G)$ is obtained.

UDC: 539.12

Received: 26.04.2004


 English version:
Journal of Mathematical Sciences (New York), 2006, 133:6, 1756–1764

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