Singularly perturbed integro-differential equations with degenerate Hammerstein’s kernel

dc.contributor.authorBobodzhanova, M.A.
dc.contributor.authorKalimbetov, B.T.
dc.contributor.authorSafonov, V.F.
dc.date.accessioned2025-01-23T05:33:42Z
dc.date.available2025-01-23T05:33:42Z
dc.date.issued2024
dc.description.abstractSingularly perturbed integro-differential equations with degenerate kernels are considered. It is shown that in the linear case these problems are always uniquely solvable with continuous coefficients, while nonlinear problems either have no real solutions at all or have several of them. For linear problems, the results of Bobojanova are refined; in particular, necessary and sufficient conditions are given for the existence of a finite limit of their solutions as the small parameter tends to zero and sufficient conditions under which the passage to the limit to the solution of the degenerate equation is possible.ru_RU
dc.identifier.citationBobodzhanova M.A., Kalimbetov B.T., Safonov V.F. Singularly perturbed integro-differential equations with degenerate Hammerstein’s kernel/ M.A. Bobodzhanova, B.T. Kalimbetov, V.F. Safonov//Bulletin of the Karaganda University. “Mathematics” Series. — 2024. — Vol. 29 - Iss. 4(116). — 58-69pp.ru_RU
dc.identifier.issn2518-7929
dc.identifier.urihttps://rep.buketov.edu.kz//handle/data/19536
dc.language.isootherru_RU
dc.publisherKaragandy University of the name of acad. E.A. Buketovru_RU
dc.relation.ispartofseries“Mathematics” Series;4(116)
dc.subjectsingularly perturbedru_RU
dc.subjectHammerstein’s equationru_RU
dc.subjectdegenerate kernelru_RU
dc.subjectFredholm’s equationsru_RU
dc.subjectanalytic functionru_RU
dc.subjectLaurent’s seriesru_RU
dc.subjectpassage to the limitru_RU
dc.subjectthe Maple programru_RU
dc.titleSingularly perturbed integro-differential equations with degenerate Hammerstein’s kernelru_RU
dc.title.alternativeSingularly perturbed integro-differential equations with degenerate kernels are considered. It is shown that in the linear case these problems are always uniquely solvable with continuous coefficients, while nonlinear problems either have no real solutions at all or have several of them. For linear problems, the results of Bobojanova are refined; in particular, necessary and sufficient conditions are given for the existence of a finite limit of their solutions as the small parameter tends to zero and sufficient conditions under which the passage to the limit to the solution of the degenerate equation is possible.ru_RU
dc.typeArticleru_RU

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