EXISTENCE AND UNIQUENESS RESULTS OF TIME FRACTIONAL GENERALIZED DIFFUSION EQUATION
摘要
Inverse problems of determining a time and space dependent source terms along with diffusion concentration from over-specified conditions for a time fractional generalized diffusion equation involving arbitrary memory kernels are considered. The existence and uniqueness results for the solution of inverse problems have been proved by the eigenfunction expansion method. In addition, we provide some special cases of the time fractional generalized diffusion equation by fixing an arbitrary memory kernel.