An inverse source problem for a two dimensional time fractional diffusion equation with nonlocal boundary conditions
Mokhtar KiraneLaboratoire de Mathématiques, Image et Applications Université de La Rochelle Avenue M. Crépeau 17042 La Rochelle Cedex FranceSalman A. MalikLaboratoire de Mathématiques, Image et Applications Université de La Rochelle Avenue M. Crépeau 17042 La Rochelle Cedex FranceM. A. Al-GwaizDepartment of Mathematics King Saud University Riyadh Saudi Arabia
2012en
ABI
Abstract
We consider the inverse source problem for a time fractional diffusion equation. The unknown source term is independent of the time variable, and the problem is considered in two dimensions. A biorthogonal system of functions consisting of two Riesz bases of the space L 2 [(0,1) × (0,1)], obtained from eigenfunctions and associated functions of the spectral problem and its adjoint problem, is used to represent the solution of the inverse problem. Using the properties of the biorthogonal system of functions, we show the existence and uniqueness of the solution of the inverse problem and its continuous dependence on the data. Copyright © 2012 John Wiley & Sons, Ltd.
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