Article

Inverse Coefficient Problem for a Fractional-Diffusion Equation with a Bessel Operator

D. I. AkramovaBukhara State University, 200117, Bukhara, Republic of Uzbekistan

Russian Mathematicsjournal2023en

ABI

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 to 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.

Topics

Differential Equations and Boundary Problems Fractional Differential Equations Solutions Nonlinear Differential Equations Analysis

Identifiers

DOI: 10.3103/s1066369x23090049

Citations and references

Cited by 5 20 references

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