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This article is cited in 16 scientific papers (total in 16 papers)
Boundary regularity of Nevanlinna domains and univalent functions in model subspaces
A. D. Baranova, K. Yu. Fedorovskiyb a St. Petersburg State University, Department of Mathematics and Mechanics
b N. E. Bauman Moscow State Technical University
Abstract:
In the paper we study boundary regularity of Nevanlinna domains, which have appeared in problems of uniform approximation by polyanalytic polynomials. A new method for constructing Nevanlinna domains with essentially irregular nonanalytic boundaries is suggested; this method is based on finding appropriate univalent
functions in model subspaces, that is, in subspaces of the form $K_\varTheta=H^2\ominus\varTheta H^2$, where $\varTheta$ is an inner function. To describe the irregularity of the boundaries of the domains obtained, recent results by Dolzhenko about boundary regularity of conformal mappings are used.
Bibliography: 18 titles.
Keywords:
Nevanlinna domain, model subspace $K_\varTheta$, conformal mapping, inner function, Blaschke product.
Received: 22.03.2011 and 11.07.2011
Citation:
A. D. Baranov, K. Yu. Fedorovskiy, “Boundary regularity of Nevanlinna domains and univalent functions in model subspaces”, Sb. Math., 202:12 (2011), 1723–1740
Linking options:
https://www.mathnet.ru/eng/sm7864https://doi.org/10.1070/SM2011v202n12ABEH004205 https://www.mathnet.ru/eng/sm/v202/i12/p3
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Abstract page: | 1110 | Russian version PDF: | 267 | English version PDF: | 9 | References: | 73 | First page: | 39 |
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