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dc.contributor.author Янчук, П. С.
dc.contributor.author Janchuk, P.
dc.date.accessioned 2023-05-24T10:27:45Z
dc.date.available 2023-05-24T10:27:45Z
dc.date.issued 2022
dc.identifier.citation Janchuk P. QS1 polynomials // Progressive research in the modern world. Proceedings of the 4th International scientific and practical conference / P. Janchuk. - Boston, USA: BoScience Publisher, 2022. - Pp. 278-287. en_US
dc.identifier.uri https://dspace.megu.edu.ua:8443/jspui/handle/123456789/3699
dc.description.abstract The author earlier developed new classes of quasi-spectral polynomials, and the study presents new findings about these classes for the efficient resolution of mathematical physics problems. By examining the approximation behavior of Fourier series by systems of quasispectral polynomials and the accompanying order of approximation, we explore the potential for retrieving information about functions that are solutions of boundary value problems. This work proves that the function, which in practice is the Sobolev space solution of the boundary value problem, can be reconstructed with the same accuracy in the base space of all square summable functions as it could be reconstructed if it were explicitly given. en_US
dc.language.iso en_US en_US
dc.publisher Boston, USA, BoScience Publisher: Progressive research in the modern world. Proceedings of the 4th International scientific and practical conference en_US
dc.subject quasispectral polynomials en_US
dc.subject Fourier series en_US
dc.subject spectral methods en_US
dc.subject approximation methods en_US
dc.subject Sobolev spaces en_US
dc.subject orthogonal polynomials en_US
dc.subject classical polynomials en_US
dc.title QS1 POLYNOMIALS en_US
dc.type Article en_US


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