Conditions for maximal regularity of solutions to fourth-order differential equations

dc.contributor.authorMoldagali, Ye.O.
dc.contributor.authorOspanov, K.N.
dc.date.accessioned2025-01-23T06:51:16Z
dc.date.available2025-01-23T06:51:16Z
dc.date.issued2024
dc.description.abstractThis article investigates a fourth-order differential equation defined in a Hilbert space, with an unbounded intermediate coefficient and potential. The key distinction from previous research lies in the fact that the intermediate term of the equation does not obey to the differential operator formed by its extreme terms. The study establishes that the generalized solution to the equation is maximally regular, if the intermediate coefficient satisfies an additional condition of slow oscillation. A corresponding coercive estimate is obtained, with the constant explicitly expressed in terms of the coefficients’ conditions. Fourth-order differential equations appear in various models describing transverse vibrations of homogeneous beams or plates, viscous flows, bending waves, and etc. Boundary value problems for such equations have been addressed in numerous works, and the results obtained have been extended to cases with smooth variable coefficients. The smoothness conditions imposed on the coefficients in this study are necessary for the existence of the adjoint operator. One notable feature of the results is that the constraints only apply to the coefficients themselves; no conditions are placed on their derivatives. Secondly, the coefficient of the lowest order in the equation may be zero, moreover, it may not be unbounded from below.ru_RU
dc.identifier.citationMoldagali Ye.O., Ospanov K.N. Conditions for maximal regularity of solutions to fourth-order differential equations./ Ye.O. Moldagali, K.N. Ospanov//Bulletin of the Karaganda University. “Mathematics” Series. — 2024. — Vol. 29 - Iss. 4(116). — 150-159pp.ru_RU
dc.identifier.issn2518-7929
dc.identifier.urihttps://rep.buketov.edu.kz//handle/data/19550
dc.language.isootherru_RU
dc.publisherKaragandy University of the name of acad. E.A. Buketovru_RU
dc.relation.ispartofseries“Mathematics” Series;4(116)
dc.subjectfourth-order differential equationru_RU
dc.subjectunbounded coefficientru_RU
dc.subjectexistenceru_RU
dc.subjectuniquenessru_RU
dc.subjectsmoothnessru_RU
dc.subjectoperatorru_RU
dc.subjectseparabilityru_RU
dc.subjectregularityru_RU
dc.subjectcoercive estimateru_RU
dc.subjectsolutionru_RU
dc.titleConditions for maximal regularity of solutions to fourth-order differential equationsru_RU
dc.title.alternativeThis article investigates a fourth-order differential equation defined in a Hilbert space, with an unbounded intermediate coefficient and potential. The key distinction from previous research lies in the fact that the intermediate term of the equation does not obey to the differential operator formed by its extreme terms. The study establishes that the generalized solution to the equation is maximally regular, if the intermediate coefficient satisfies an additional condition of slow oscillation. A corresponding coercive estimate is obtained, with the constant explicitly expressed in terms of the coefficients’ conditions. Fourth-order differential equations appear in various models describing transverse vibrations of homogeneous beams or plates, viscous flows, bending waves, and etc. Boundary value problems for such equations have been addressed in numerous works, and the results obtained have been extended to cases with smooth variable coefficients. The smoothness conditions imposed on the coefficients in this study are necessary for the existence of the adjoint operator. One notable feature of the results is that the constraints only apply to the coefficients themselves; no conditions are placed on their derivatives. Secondly, the coefficient of the lowest order in the equation may be zero, moreover, it may not be unbounded from below.ru_RU
dc.typeArticleru_RU

Files

Original bundle

Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
13.pdf
Size:
899.69 KB
Format:
Adobe Portable Document Format
Description:

License bundle

Now showing 1 - 1 of 1
Loading...
Thumbnail Image
Name:
license.txt
Size:
1.71 KB
Format:
Item-specific license agreed upon to submission
Description: