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dc.contributor.authorKlevchuk, Ivan
dc.contributor.authorHrytchuk, Mykola
dc.date.accessioned2023-09-30T14:52:13Z
dc.date.available2023-09-30T14:52:13Z
dc.date.issued2023-09-29
dc.identifier.citationKLEVCHUK IVAN, HRYTCHUK MYKOLA EXISTENCE AND STABILITY OF CYCLES IN PARABOLIC SYSTEMS WITH SMALL DIFFUSION // International scientific conference «MATHEMATICS AND INFORMATION TECHNOLOGIES» – Chernivtsi, 2023. – P. 66-67.uk_UA
dc.identifier.urihttps://archer.chnu.edu.ua/xmlui/handle/123456789/7437
dc.descriptionThe aim of the present paper is to investigate of some properties of periodic solutions of a nonlinear autonomous parabolic systems with a periodic condition. We investigate parabolic systems of differential equations using an integral manifolds method of the theory of nonlinear oscillations. We prove the existence of periodic solutions in an autonomous parabolic system of differential equations with weak diffusion on the circle. We study the existence and stability of an arbitrarily large finite number of cycles for a parabolic system with weak diffusion. The periodic solution of parabolic equation is sought in the form of traveling wave. A representation of the integral manifold is obtained. We seek a solution of parabolic system with the periodic condition in the form of a Fourier series in the complex form and introduce a norm in the space of the coefficients in the Fourier expansion. We use the normal forms method in the general parabolic system of differential equations with retarded argument and weak diffusion. We use bifurcation theory for delay differential equations and quasilinear parabolic equations. The existence of periodic solutions in an autonomous parabolic system of differential equations on the circle with retarded argument and small diffusion is proved. The problems of existence and stability of traveling waves in the parabolic system with retarded argument and weak diffusion are investigated.uk_UA
dc.description.abstractThe aim of the present paper is to investigate of some properties of periodic solutions of a nonlinear autonomous parabolic systems with a periodic condition. We investigate parabolic systems of differential equations using an integral manifolds method of the theory of nonlinear oscillations. We prove the existence of periodic solutions in an autonomous parabolic system of differential equations with weak diffusion on the circle. We study the existence and stability of an arbitrarily large finite number of cycles for a parabolic system with weak diffusion. The periodic solution of parabolic equation is sought in the form of traveling wave. A representation of the integral manifold is obtained. We seek a solution of parabolic system with the periodic condition in the form of a Fourier series in the complex form and introduce a norm in the space of the coefficients in the Fourier expansion. We use the normal forms method in the general parabolic system of differential equations with retarded argument and weak diffusion. We use bifurcation theory for delay differential equations and quasilinear parabolic equations. The existence of periodic solutions in an autonomous parabolic system of differential equations on the circle with retarded argument and small diffusion is proved. The problems of existence and stability of traveling waves in the parabolic system with retarded argument and weak diffusion are investigated.uk_UA
dc.language.isoenuk_UA
dc.publisherYuriy Fedkovych Chernivtsi National Universityuk_UA
dc.subjectbifurcation, stability, functional differential equation, integral manifold, traveling waveuk_UA
dc.titleEXISTENCE AND STABILITY OF CYCLES IN PARABOLIC SYSTEMS WITH SMALL DIFFUSIONuk_UA


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