English

Inverse problem for fractional order subdiffusion equation

Analysis of PDEs 2023-09-12 v1

Abstract

The study examines the inverse problem of finding the appropriate right-hand side for the subdiffusion equation with the Caputo fractional derivative in a Hilbert space represented by HH. The right-hand side of the equation has the form g(t)fg(t)f and an element fHf\in H is unknown. If the sign of g(t)g(t) is a constant, then the existence and uniqueness of the solution is proved. When g(t)g(t) changes sign, then in some cases, the existence and uniqueness of the solution is proved, in other cases, we found the necessary and sufficient condition for a solution to exist. Obviously, we need an extra condition to solve this inverse problem. We take the additional condition in the form 0Tu(t)dt=ψ\int\limits_0^Tu(t)dt=\psi. Here ψ\psi is a given element, of HH.

Keywords

Cite

@article{arxiv.2309.04852,
  title  = {Inverse problem for fractional order subdiffusion equation},
  author = {Marjona Shakarova},
  journal= {arXiv preprint arXiv:2309.04852},
  year   = {2023}
}
R2 v1 2026-06-28T12:17:07.224Z