On a non-local problem for a fractional differential equation of the Boussinesq type

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Karagandy University of the name of academician E.A. Buketov

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In recent years, the fractional partial differential equation of the Boussinesq type has attracted much attention from researchers due to its practical importance. In this paper, we study a non-local problem for the Boussinesq type equation D t u(t) + AD t u(t) + 2Au(t) = 0; 0 < t < T; 1 < < 3=2; where D t is the Caputo fractional derivative, and A is an abstract operator. In the classical case, i.e., when = 2, this problem has been studied previously, and an interesting effect has been discovered: the existence and uniqueness of a solution depend significantly on the length of the time interval and the parameter . In this note, we show that in the case of a fractional equation, there is no such effect: a solution of the problem exists and is unique for any T and v.

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Ashurov R.R. On a non-local problem for a fractional differential equation of the Boussinesq type/R.R. Ashurov, Yu.E. Fayziev, M.U. Khudoykulova//Қарағанды университетінің хабаршысы. Математика сериясы= Вестник Карагандинского университета. Серия математика= Bulletin of the Karaganda university. Mathematics series.-2024. №3. Р.34-45.

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