On the non-uniqueness of the solution to a boundary value problem of heat conduction with a load in the form of a fractional derivative
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Karagandy University of the name of acad. E.A. Buketov
Abstract
The paper deals with the second boundary value problem for the loaded heat equation in the first quadrant. The loaded term contains a fractional derivative in the Caputo sense of an order ; 2 < < 3. The boundary value problem is reduced to an integro-differential equation with a difference kernel by inverting the differential part. It is proved that a homogeneous integro-differential equation has at least one non-zero solution. It is shown that the solution of the homogeneous boundary value problem corresponding to the
original boundary value problem is not unique, and the load acts as a strong perturbation of the boundary value problem.
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Kosmakova M.T. On the non-uniqueness of the solution to a boundary value problem of heat conduction with a load in the form of a fractional derivative/M.T. Kosmakova, K.A. Izhanova, A.N. Khamzeyeva//Bulletin of the Karaganda University. Mathematics series. – 2022-№ 4(108). – pp.98-106.