Well-posedness for the backward problems in time for general time-fractional diffusion equation

Abstract

In this article, we consider a partial differential equation with Caputo time-derivative: ∂tα u + Au = F where 0< α < 1 and u satisfies the zero Dirichlet boundary condition. For a non-symmetric elliptic operator -A of the second order and given F, we prove the well-posedness for the backward problem in time and our result generalizes the existing results assuming that A is symmetric. The key is the perturbation argument and the completeness of the generalized eigenfunctions of the elliptic operator A.