Discrete and Continuous Dynamical Systems-series B | 2021
On a terminal value problem for a system of parabolic equations with nonlinear-nonlocal diffusion terms
Abstract
We study a terminal value parabolic system with nonlinear-nonlocal diffusions. Firstly, we consider the issue of existence and ill-posed property of a solution. Then we introduce two regularization methods to solve the system in which the diffusion coefficients are globally Lipschitz or locally Lipschitz under some a priori assumptions on the sought solutions. The existence, uniqueness and regularity of solutions of the regularized problem are obtained. Furthermore, The error estimates show that the approximate solution converges to the exact solution in \\begin{document}$ L^2 $\\end{document} norm and also in \\begin{document}$ H^1 $\\end{document} norm.