Determination of an Energy Source Term for Fractional Diffusion Equation

Mahmoud, Sid Ahmed Ould Ahmed; Sidi, Hamed Ould; Sidi, Maawiya Ould

doi:10.1155/2022/7984688

Journal of Sensors

2022

DOI: 10.1155/2022/7984688

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Determination of an Energy Source Term for Fractional Diffusion Equation

Sid Ahmed Ould Ahmed Mahmoud

Hamed Ould Sidi

Maawiya Ould Sidi

Abstract: In this article, we will determine the source term of the fractional diffusion equation (FDE). Our contribution to this work is the generalization of the common inverse diffusion equation issues and the inverse diffusion equation problems for fractional diffusion equations with energy source and using Caputo fractional derivatives in time and space. The problem is reformulated in a least-squares framework, which leads to a nonconvex minimization problem, which is solved using a Tikhonov regularization. By cons… Show more

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Cited by 3 publications

References 32 publications

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Robin coefficient determination problem in a fractional parabolic differential equation

Sidi,

Alosaimi

et al. 2024

Math Methods in App Sciences

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This article discusses the identification of an unknown Robin coefficient in a fractional parabolic equation using a noisy measurement of the ultimate solution over time. The problem is quite complex, involving a nonlocal, nonlinear, and ill‐posed operator. To solve this problem, the article proposes a regularized optimization approach that minimizes a least‐squares cost function. The article also examines the various conceptual and real‐world challenges associated with this problem. The article demonstrates the presence of a singular and stable solution for the optimization problem. It utilizes the Morozov discrepancy principle and the conjugate gradient method to streamline the iterative reconstruction process. The proposed method is accurate and efficient, as several numerical examples demonstrate.

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Robin coefficient determination problem in a fractional parabolic differential equation

Sidi,

Alosaimi

et al. 2024

Math Methods in App Sciences

View full text Add to dashboard Cite

show abstract

Numerical reconstruction of a space-dependent source term for multidimensional space-time fractional diffusion equations

OULD SIDI,

ZAKY,

EL WALED

et al. 2023

Rom. Rep. Phys.

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Simultaneous numerical inversion of space-dependent initial condition and source term in multi-order time-fractional diffusion models

H.,

M.,

et al. 2024

Rom. Rep. Phys.

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This article deals with a simultaneous reconstruction of unknown initial conditions and space-dependent source function in multi-order time-fractional diffusion problems. We discuss the existence and uniqueness of the direct problem. The problem is presented as a regularized optimization problem and converted into a variational problem. The existence of the minimizer for the optimization problem is demonstrated. For the numerical part, a modified Levenberg-Marquardt regularization approach is constructed to identify the initial condition and source function. Several numerical examples in one and two dimensions are employed to test the performance of the identification technique.

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Determination of an Energy Source Term for Fractional Diffusion Equation

Cited by 3 publications

References 32 publications

Robin coefficient determination problem in a fractional parabolic differential equation

Robin coefficient determination problem in a fractional parabolic differential equation

Numerical reconstruction of a space-dependent source term for multidimensional space-time fractional diffusion equations

Simultaneous numerical inversion of space-dependent initial condition and source term in multi-order time-fractional diffusion models

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