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VIDEO LIBRARY |
Conference on the Theory of Functions of Several Real Variables, dedicated to the 90th anniversary of O. V. Besov
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Strong and weak associativity and reflexivity of certain function classes V. D. Stepanovab a Steklov Mathematical Institute of Russian Academy of Sciences, Moscow b Computer Centre of Far Eastern Branch RAS, Khabarovsk |
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Abstract: The paper provides an overview of recent results on the problem of character- ization of associated and doubly associated spaces to functional classes including both ideal and non-ideal structures. The latter include two-weight Sobolev spaces of the first order on the positive semi-axis [1]. It is shown that, unlike the con- cept of duality, associativity can be “strong” and “weak”. At the same time, the twice-associated spaces are divided into three more types. In this context, it is established that the Sobolev space of functions with a compact support has weakly associated reflexivity, and a strongly associated to a weakly associated space consists only of zero [2]. Similar properties are possessed by weight classes of Cesaro and Copson type, for which the problem has been fully studied and their connection with Sobolev spaces with power weights has been established [3]. As an application, the problem of the boubdedness of the Hilbert transformation from the Sobolev weight space to the Lebesgue weight space is considered [4]. References
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