Identifying the Space Source Term Problem for Time-Space Diffusion Equation
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Date
2020
Journal Title
Journal ISSN
Volume Title
Publisher
Springer
Open Access Color
GOLD
Green Open Access
No
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No
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Impulse
Top 10%
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Average
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Top 10%
Abstract
In this paper, we consider an inverse source problem for the time-space-fractional diffusion equation. Here, in the sense of Hadamard, we prove that the problem is severely ill-posed. By applying the quasi-reversibility regularization method, we propose by this method to solve the problem (1.1). After that, we give an error estimate between the sought solution and regularized solution under a prior parameter choice rule and a posterior parameter choice rule, respectively. Finally, we present a numerical example to find that the proposed method works well.
Description
Rathinasamy, Sakthivel/0000-0002-5528-2709
ORCID
Keywords
Inverse Source Problem, Time-Space-Fractional Diffusion Equation, Ill-Posed Problem, Convergence Estimates, Regularization Method, 35K05, 35K99, 47J06, 47H10X, Time-space-fractional diffusion equation, Artificial intelligence, Inverse Problems in Mathematical Physics and Imaging, Inverse Scattering Theory, Economics, Inverse Problems, Diffusion equation, Space (punctuation), Mathematical analysis, Quantum mechanics, Term (time), Engineering, Differential equation, Service (business), QA1-939, FOS: Mathematics, Regularization (linguistics), Anomalous Diffusion Modeling and Analysis, Mathematical Physics, Hadamard transform, Convergence estimates, Time-Fractional Diffusion Equation, Tikhonov regularization, Physics, Mathematical optimization, Inverse source problem, Partial differential equation, Economy, Applied mathematics, Computer science, Fracture Mechanics Modeling and Simulation, Operating system, Mechanics of Materials, Modeling and Simulation, Ill-posed problem, Physical Sciences, Inverse problem, Well-posed problem, Mathematics, Anomalous Diffusion, Ordinary differential equation, Regularization method, Inverse problems for PDEs, Fractional derivatives and integrals, time-space-fractional diffusion equation, regularization method, ill-posed problem, inverse source problem, convergence estimates, Fractional partial differential equations, Ill-posed problems for PDEs
Fields of Science
02 engineering and technology, 01 natural sciences, 0202 electrical engineering, electronic engineering, information engineering, 0101 mathematics
Citation
WoS Q
Q1
Scopus Q
N/A
OpenCitations Citation Count
10
Source
Advances in Difference Equations
Volume
2020
Issue
1
Start Page
End Page
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Citations
Scopus : 17
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Mendeley Readers : 2
SCOPUS™ Citations
18
checked on Feb 26, 2026
Web of Science™ Citations
9
checked on Feb 26, 2026
Page Views
1
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