Inverse coefficient problem for a fractional-diffusion equation with a Bessel operator

Abstract

The second initial-boundary value problem in a bounded domain for a fractional-diffusion equation with the Bessel operator and the Gerasimov-Caputo derivative is investigated. Theorems of existence and uniqueness of the solution of the inverse problem of determining the lowest coefficient in a one-dimensional fractional diffusion equation under the condition of integral observation are obtained. The Schauder principle was used to prove the existence of the solution.

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Identifiers

DOI

10.26907/0021-3446-2023-9-45-57

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