State-constrained controllability of linear reaction-diffusion systems
Optimization and Control
2021-05-18 v4 Analysis of PDEs
Abstract
We study the controllability of a coupled system of linear parabolic equations, with non-negativity constraint on the state. We establish two results of controllability to trajectories in large time: one for diagonal diffusion matrices with an "approximate" nonnegativity constraint, and a another stronger one, with "exact" nonnegativity constraint, when all the diffusion coefficients are equal and the eigenvalues of the coupling matrix have nonnegative real part. The proofs are based on a "staircase" method. Finally, we show that state-constrained controllability admits a positive minimal time, even with weaker unilateral constraint on the state.
Cite
@article{arxiv.2011.04165,
title = {State-constrained controllability of linear reaction-diffusion systems},
author = {Pierre Lissy and Clément Moreau},
journal= {arXiv preprint arXiv:2011.04165},
year = {2021}
}
Comments
20 pages