Nataliia Kinash scite author profile

In this article, we consider two inverse problems with a generalized fractional derivative. The first problem, IP1, is to reconstruct the function u based on its value and the value of its fractional derivative in the neighborhood of the final time. We prove the uniqueness of the solution to this problem. Afterwards, we investigate the IP2, which is to reconstruct a source term in an equation that generalizes fractional diffusion and wave equations, given measurements in a neighborhood of final time. The source to be determined depends on time and all space variables. The uniqueness is proved based on the results for IP1. Finally, we derive the explicit solution formulas to the IP1 and IP2 for some particular cases of the generalized fractional derivative.

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Reconstruction of an order of derivative and a source term in a fractional diffusion equation from final measurements

Janno

Kinash

2018

Inverse Problems

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Inverse problems for a perturbed time fractional diffusion equation with final overdetermination

Kinash

Janno

2017

Math Methods in App Sciences

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Inverse Problems for a Generalized Subdiffusion Equation With Final Overdetermination

Janno

Kinash

2019

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We consider two inverse problems for a generalized subdiffusion equation that use the final overdetermination condition. Firstly, we study a problem of reconstruction of a specific space-dependent component in a source term. We prove existence, uniqueness and stability of the solution to this problem. Based on these results, we consider an inverse problem of identification of a space-dependent coefficient of a linear reaction term. We prove the uniqueness and local existence and stability of the solution to this problem.

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Retrieving the time-dependent thermal conductivity of an orthotropic rectangular conductor

Hussein

Kinash

Lesnic

et al. 2016

Applicable Analysis

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Nataliia Kinash

An Inverse Problem for a Generalized Fractional Derivative with an Application in Reconstruction of Time- and Space-Dependent Sources in Fractional Diffusion and Wave Equations

Reconstruction of an order of derivative and a source term in a fractional diffusion equation from final measurements

Inverse problems for a perturbed time fractional diffusion equation with final overdetermination

Inverse Problems for a Generalized Subdiffusion Equation With Final Overdetermination

Retrieving the time-dependent thermal conductivity of an orthotropic rectangular conductor

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