Determination of an unknown source term and the temperature distribution for the linear heat equation involving fractional derivative in time

Kirane, Mokhtar; Malik, Salman A.

doi:10.1016/j.amc.2011.05.084

Cited by 79 publications

(88 citation statements)

References 17 publications

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“…In Ahmad et al, there are good references to publications on related issues. We note from recent papers close to the theme of our article. In these papers, different variants of direct and inverse initial‐boundary value problems for evolutionary equations are considered, including problems with nonlocal boundary conditions and problems for equations with fractional derivatives.…”

Section: Reduction To a Mathematical Problemmentioning

confidence: 85%

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On an inverse problem of reconstructing a subdiffusion process from nonlocal data

Kirane

Sadybekov

Sarsenbi

2019

Math Methods in App Sciences

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We consider a problem of modeling the thermal diffusion process in a closed metal wire wrapped around a thin sheet of insulation material. The layer of insulation is assumed to be slightly permeable. Therefore, the temperature value from one side affects the diffusion process on the other side. For this reason, the standard heat equation is modified, and a third term with an involution is added. Modeling of this process leads to the consideration of an inverse problem for a one‐dimensional fractional evolution equation with involution and with periodic boundary conditions with respect to a space variable. This equation interpolates heat equation. Such equations are also called nonlocal subdiffusion equations or nonlocal heat equations. The inverse problem consists in the restoration (simultaneously with the solution) of the unknown right‐hand side of the equation, which depends only on the spatial variable. The conditions for overdefinition are initial and final states. Existence and uniqueness results for the given problem are obtained via the method of separation of variables.

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Section: Reduction To a Mathematical Problemmentioning

confidence: 85%

“…The mathematical problem to for a = 0 was considered in Torebek and Tapdigoglu, and for a = β = 0 in Kirane et al…”

Section: Reduction To a Mathematical Problemmentioning

confidence: 99%

On an inverse problem of reconstructing a subdiffusion process from nonlocal data

Kirane

Sadybekov

Sarsenbi

2019

Math Methods in App Sciences

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“…These sets form a biorthogonal system for the space L 2 (0, 1) and by using the biorthogonal system we expand the unknown functions into series to solve the inverse problem. By using the biorthogonal system, the inverse problem of determining unknown functions has been already considered in the literature, see for example [12,13,19].…”

Section: U(xt)dx = K(t)mentioning

confidence: 99%

A new approach for determination of boundary function for diffusion equation by fourier method

Özgür¹,

Demir²,

Erman³

2017

ntmsci

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Abstract:We consider a linear diffusion equation with a nonlocal boundary condition. We attempt to recover the boundary condition and the solution of diffusion equation for a problem by making use of an over-determination condition of integral type. Explicit solutions for these unknowns are derived by employing Fourier method. We obtain sufficient conditions for the existence and uniqueness of the solution and determination of boundary condition.

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“…In [33], when additional data is given on the partial boundary, the uniqueness in identifying a source term independent of time is established for one-dimensional time fractional diffusion equation. In [30], if the final time temperature distribution is known, the existence and uniqueness results are proved. Murio and Mejía [31] propose a mollification regularization technique to reconstruct the unknown forcing term ( , ).…”

Section: Introductionmentioning

confidence: 99%

“…For elliptic-type differential equation, one can refer to [27][28][29], though the source identification problem has been well discussed in the classic framework, yet, to the best of the authors' knowledge, there are rare researches in the aspect of the source identification problem associated with fractional differential equation in spite of the physical and practical importance. As indicated in [30][31][32][33], the source identification problem associated with the time fractional diffusion equation is also ill-posed. That means the solution does not depend continuously on the given data and any small perturbation in the given data may cause large change to the solution.…”

Section: Introductionmentioning

confidence: 99%

A Point Source Identification Problem for a Time Fractional Diffusion Equation

Yang

Deng

2013

Advances in Mathematical Physics

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An inverse source identification problem for a time fractional diffusion equation is discussed. The unknown heat source is supposed to be space dependent only. Based on the use of Green's function, an effective numerical algorithm is developed to recover both the intensities and locations of unknown point sources from final measurements. Numerical results indicate that the proposed method is efficient and accurate.

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Determination of an unknown source term and the temperature distribution for the linear heat equation involving fractional derivative in time

Cited by 79 publications

References 17 publications

On an inverse problem of reconstructing a subdiffusion process from nonlocal data

On an inverse problem of reconstructing a subdiffusion process from nonlocal data

A new approach for determination of boundary function for diffusion equation by fourier method

A Point Source Identification Problem for a Time Fractional Diffusion Equation

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