To Solving the Heat Equation with Fractional Load
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Lobachevskii Journal of Mathematics
Abstract
In the paper, a boundary value problem for a fractionally loaded heat equations is
considered in the first quadrant. The questions of the existence and uniqueness of the solution
are investigated in the class of continuous functions. The loaded term has the form of the Caputo
fractional derivative with respect to the spatial variable, and, the order of the derivative in the loaded
term is less than the order of the differential part. The study is based on reducing the boundary
value problem to a Volterra integral equation of the second kind. The kernel of the obtained integral
equation contains a special function, namely, the generalized hypergeometric series. It is shown that
the existence and uniqueness of solutions to the integral equation depends both on the order of the
fractional derivative in the loaded term of the initial boundary value problem and on the behavior
character of the load.
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Citation
Kosmakova M.T. To Solving the Heat Equation with Fractional Load/ M. T. Kosmakova, M. I. Ramazanov, L. Zh. Kasymova// Lobachevskii Journal of Mathematics. - 2021. - Vol.42. - №12 - pp. 2854–2866.