Inverse problem for the subdiffusion equation with fractional Caputo derivative

Авторы

  • R.R. Ashurov
    Institute of Mathematics, Uzbekistan Academy of Science
    University of Tashkent for Applied Sciences
  • M.D. Shakarova
    Institute of Mathematics, Uzbekistan Academy of Science

Ключевые слова:

subdiffusion equation, forward and inverse problems, the Caputo derivatives, Fourier method

Аннотация

The inverse problem of determining the right-hand side of the subdiffusion equation with the fractional Caputo derivative is considered. The right-hand side of the equation has the form $f(x)g(t)$ and the unknown is function $f(x)$. The condition $ u (x,t_0)= \psi (x) $ is taken as the over-determination condition, where $t_0$ is some interior point of the considering domain and $\psi (x) $ is a given function. It is proved by the Fourier method that under certain conditions on the functions $g(t)$ and $\psi (x) $ the solution of the inverse problem exists and is unique. An example is given showing the violation of the uniqueness of the solution of the inverse problem for some sign-changing functions $g(t)$. For such functions $g(t)$, we find necessary and sufficient conditions on the initial function and on the function from the over-determination condition, which ensure the existence of a solution to the inverse problem.

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Опубликован

16.05.2024