Volume 52, pp. 431-454, 2020.
Analysis of Krylov subspace approximation to large-scale differential Riccati equations
Antti Koskela and Hermann Mena
Abstract
We consider a Krylov subspace approximation method for the symmetric differential Riccati equation $\dot{X} = AX + XA^T + Q - XSX$, $X(0)=X_0$. The method we consider is based on projecting the large-scale equation onto a Krylov subspace spanned by the matrix $A$ and the low-rank factors of $X_0$ and $Q$. We prove that the method is structure preserving in the sense that it preserves two important properties of the exact flow, namely the positivity of the exact flow and also the property of monotonicity. We provide a theoretical a priori error analysis that shows superlinear convergence of the method. Moreover, we derive an a posteriori error estimate that is shown to be effective in numerical examples.
Full Text (PDF) [614 KB], BibTeX
Key words
differential Riccati equations, LQR optimal control problems, large-scale ordinary differential equations, Krylov subspace methods, matrix exponential, exponential integrators, model order reduction, low-rank approximation
AMS subject classifications
65F10, 65F60, 65L20, 65M22, 93A15, 93C05
< Back