Boundary value problems of integrodifferential equations under boundary conditions taking into account physical nonlinearity

dc.contributor.authorSeitmuratov, A.Zh.
dc.contributor.authorMedeubaev, N.K.
dc.contributor.authorKozhoshov, T.T.
dc.contributor.authorMedetbekov, B.R.
dc.date.accessioned2023-09-15T05:41:27Z
dc.date.available2023-09-15T05:41:27Z
dc.date.issued2023-06-30
dc.description.abstractWhen solving integrodifferential equations under boundary conditions, taking into account physical nonlinearity, a broad class of boundary-value problems of oscillations arises associated with various boundary conditions at the edges of a flat element. When taking into account non-stationary external influences, the main parameters is the frequency of natural vibrations of a flat component, taking into account temperature, prestressing, and other factors. The study of such problems, taking into account complicating factors, reduces to solving rather complex problems. The difficulty of solving these problems is due to both the type of equations and the variety. We analyze the results of previous works on the boundary problems of vibrations of plane elements. Possible boundary conditions at the edges of a flat element and the necessary initial conditions for solving particular problems of self-oscillation and forced vibrations, and other problems are considered. The set of equations, boundaries, and initial conditions make it possible to formulate and solve various boundary value problems of vibrations for a flat element. The oscillation equations for a flat element in the form of a plate given in this paper contain viscoelastic operators that describe the viscous behavior of the materials of a flat component. In studying oscillations and wave processes, it is advisable to take the kernels of viscoelastic operators regularly, since only such operators describe instantaneous elasticity and then viscous flow.ru_RU
dc.identifier.citationBoundary value problems of integrodifferential equations under boundary conditions taking into account physical nonlinearity/Seitmuratov A.Zh. [et al.] // Bulletin of the Karaganda University. Mathematics series. – 2023-№ 2(110). – pp.131-141.ru_RU
dc.identifier.issn2663–5011
dc.identifier.urihttps://rep.buketov.edu.kz//handle/data/16822
dc.language.isoenru_RU
dc.publisherKaragandy University of the name of acad. E.A. Buketovru_RU
dc.relation.ispartofseriesBulletin of the Karaganda University. Mathematics series.;№2(110)
dc.subjectphysical nonlinearityru_RU
dc.subjectplatesru_RU
dc.subjectoscillationsru_RU
dc.subjectboundary value problemsru_RU
dc.subjectwave processru_RU
dc.subjectisotropic platesru_RU
dc.subjectintegrodifferential equationru_RU
dc.subjectapproximate equationru_RU
dc.subjectnonlinear operatorsru_RU
dc.titleBoundary value problems of integrodifferential equations under boundary conditions taking into account physical nonlinearityru_RU
dc.title.alternativeФизикалық бейсызықты негізіндегі шекаралық шарттардағы интегралдық-дифференциалдық теңдеулердің шеттік есептеріru_RU
dc.title.alternativeКраевые задачи интегро—дифференциальных уравнений при граничных условиях с учетом физической нелинейностиru_RU
dc.typeArticleru_RU

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