پديدآورندگان :
Safaie AlI alisafaie549@gmail.com Department of Mathematics, Faculty of Science, University of Maragheh, Maragheh, Iran , Salehi Shayegan Amir Hossein ah.salehi@alumni.kntu.ac.ir Mathematics Department, Faculty of Basic Science, Khatam-ol-Anbia (PBU) University, Tehran, Iran , Shahriari Mohammad shahriari@maragheh.ac.ir Department of Mathematics, Faculty of Science, University of Maragheh, Maragheh, Iran
كليدواژه :
Inverse Source Problem , time fractional diffusion equation , adjoint problem , Fréchet derivative
چكيده فارسي :
The problem of determining the source term f = f(x) in a time fractional diffusion equation from the measured data at the final time is formulated. To this end, a methodology involving minimization of the cost functional is applied and proved that the Fréchet derivative ofthe cost functional can be formulated via the solution of an adjoint prob_x0002_lem. The obtained results permit one to prove existence and uniqueness of a quasi solution of the considered inverse problems, as well as to construct a monotone iteration scheme based on a gradient-type method.
