Approximation of an Inverse Initial Problem for a Biparabolic Equation |
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| Authors: | Huy?Tuan?Nguyen mailto:nguyenhuytuan@tdt.edu.vn" title=" nguyenhuytuan@tdt.edu.vn" itemprop=" email" data-track=" click" data-track-action=" Email author" data-track-label=" " >Email author,Mokhtar?Kirane,Nam?Danh?Hua?Quoc,Van?Au?Vo |
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| Affiliation: | 1.Applied Analysis Research Group, Faculty of Mathematics and Statistics,Ton Duc Thang University,Ho Chi Minh,Vietnam;2.LaSIE, Facult des Sciences et Technologies,Universi de La Rochelle,La Rochelle Cedex,France;3.NAAM Research Group, Department of Mathematics, Faculty of Science,King Abdulaziz University,Jeddah,Saudi Arabia;4.RUDN University,Moscow,Russia;5.Faculty of General Sciences,Can Tho University of Technology,Can Tho,Viet Nam;6.Department of Science Management,Thu Dau Mot University,Thu Dau Mot,Viet Nam |
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| Abstract: | ![]()
In this paper, we consider the problem of finding the initial distribution for the linear inhomogeneous and nonlinear biparabolic equation. The problem is severely ill-posed in the sense of Hadamard. First, we apply a general filter method to regularize the linear nonhomogeneous problem. Then, we also give a regularized solution and consider the convergence between the regularized solution and the sought solution. Under the a priori assumption on the exact solution belonging to a Gevrey space, we consider a generalized nonlinear problem by using the Fourier truncation method to obtain rigorous convergence estimates in the norms on Hilbert space and Hilbert scale space. |
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