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On the Resolvent Existence and the Separability of a Hyperbolic Operator with Fast Growing Coefficients in L2(R 2 )

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dc.contributor.author Muratbekova, Mussakan
dc.contributor.author Bayandiyev, Yerik
dc.date.accessioned 2024-12-18T07:37:35Z
dc.date.available 2024-12-18T07:37:35Z
dc.date.issued 2021
dc.identifier.issn 1501-7710
dc.identifier.other doi.org/10.2298/FIL2103707M
dc.identifier.uri http://rep.enu.kz/handle/enu/20327
dc.description.abstract This paper studies the question of the resolvent existence, as well as, the smoothness of elements from the definition domain (separability) of a class of hyperbolic differential operators defined in an unbounded domain with greatly increasing coefficients after a closure in the space L2(R 2 ). Such a problem was previously put forward by I.M. Gelfand for elliptic operators. Here, we note that a detailed analysis shows that when studying the spectral properties of differential operators specified in an unbounded domain, the behavior of the coefficients at infinity plays an important role. ru
dc.language.iso en ru
dc.publisher Faculty of Sciences and Mathematics ru
dc.relation.ispartofseries 35:3 (2021), 707–721;
dc.title On the Resolvent Existence and the Separability of a Hyperbolic Operator with Fast Growing Coefficients in L2(R 2 ) ru
dc.type Article ru


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