On solvability of the inverse problem for a fourth-order parabolic equation with a complex-valued coefficient
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Академик Е.А. Бөкетов атындағы Қарағанды университеті
Abstract
In this paper, the inverse problem for a fourth-order parabolic equation with a variable complex-valued
coefficient is studied by the method of separation of variables. The properties of the eigenvalues of the
Dirichlet and Neumann boundary value problems for a non-self-conjugate fourth-order ordinary differential
equation with a complex-valued coefficient are established. Known results on the Riesz basis property
of eigenfunctions of boundary value problems for ordinary differential equations with strongly regular
boundary conditions in the space L2 (1; 1) are used. On the basis of the Riesz basis property of eigenfunctions,
formal solutions of the problems under study are constructed and theorems on the existence and uniqueness
of solutions are proved. When proving theorems on the existence and uniqueness of solutions, the Bessel
inequality for the Fourier coefficients of expansions of functions from space L2 (1; 1) into a Fourier series
in the Riesz basis is widely used. The representations of solutions in the form of Fourier series in terms
of eigenfunctions of boundary value problems for a fourth-order equation with involution are derived. The
convergence of the obtained solutions is discussed.
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Imanbetova A.B. On solvability of the inverse problem for a fourth-order parabolic equation with a complex-valued coefficient/A.B. Imanbetova, A.A. Sarsenbi, B. Seilbekov//Қарағанды университетінің хабаршысы. Математика сериясы.= Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda University. Mathematics Series. -2024. №1. Р.60-72.