Pointwise-in-time error estimates for an optimal control problem with subdiffusion constraint
Abstract
In this work, we present numerical analysis for a distributed optimal control problem, with box constraint on the control, governed by a subdiffusion equation which involves a fractional derivative of order in time. The fully discrete scheme is obtained by applying the conforming linear Galerkin finite element method in space, L1 scheme/backward Euler convolution quadrature in time, and the control variable by a variational type discretization. With a space mesh size and time stepsize , we establish the following order of convergence for the numerical solutions of the optimal control problem: in the discrete norm and in the discrete norm, with any small and . The analysis relies essentially on the maximal -regularity and its discrete analogue for the subdiffusion problem. Numerical experiments are provided to support the theoretical results.
Cite
@article{arxiv.1707.08808,
title = {Pointwise-in-time error estimates for an optimal control problem with subdiffusion constraint},
author = {Bangti Jin and Buyang Li and Zhi Zhou},
journal= {arXiv preprint arXiv:1707.08808},
year = {2017}
}
Comments
20 pages, 6 figures