Integro-differential equations with bounded operators in Banach spaces
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Karagandy University of the name of acad. E.A. Buketov
Abstract
The paper investigates integro-differential equations in Banach spaces with operators, which are a composition
of convolution and differentiation operators. Depending on the order of action of these two operators, we
talk about integro-differential operators of the Riemann Liouville type, when the convolution operator acts
first, and integro-differential operators of the Gerasimov type otherwise. Special cases of the operators under
consideration are the fractional derivatives of Riemann Liouville and Gerasimov, respectively. The classes
of integro-differential operators under study also include those in which the convolution has an integral
kernel without singularities. The conditions of the unique solvability of the Cauchy type problem for a linear
integro-differential equation of the Riemann Liouville type and the Cauchy problem for a linear integrodifferential
equation of the Gerasimov type with a bounded operator at the unknown function are obtained.
These results are used in the study of similar equations with a degenerate operator at an integro-differential
operator under the condition of relative boundedness of the pair of operators from the equation. Abstract
results are applied to the study of initial boundary value problems for partial differential equations with
an integro-differential operator, the convolution in which is given by the Mittag-Leffler function multiplied
by a power function.
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Fedorov, V.E. Integro-differential equations with bounded operators in Banach spaces/V.E. Fedorov, A.D. Godova, B.T. Kien//Bulletin of the Karaganda University. «Mathematics» series.-2022.-№2(106).-p.93-107