论文信息 - Innovative Integrators for Computing the Optimal State in LQR Problems

Innovative Integrators for Computing the Optimal State in LQR Problems

We consider the numerical approximation of linear quadratic optimal control problems for partial differential equations where the dynamics is driven by a strongly continuous semigroup. For this problems, the optimal control is given in feedback form, i.e., it relies on solving the associated Riccati equation and the optimal state. We propose innovative integrators for solving the optimal state based on operator splitting procedures and exponential integrators and prove their convergence. We illustrate the performance of our approach in numerical experiments.

Hermann Mena | Petra Csomós | H. Mena | P. Csomós

[1] C. Lubich,et al. Error Bounds for Exponential Operator Splittings , 2000 .

[2] Awad H. Al-Mohy,et al. Computing the Action of the Matrix Exponential, with an Application to Exponential Integrators , 2011, SIAM J. Sci. Comput..

[3] Alain Bensoussan,et al. Representation and Control of Infinite Dimensional Systems, 2nd Edition , 2007, Systems and control.

[4] R. Triggiani,et al. Control Theory for Partial Differential Equations: Continuous and Approximation Theories , 2000 .

[5] Peter Benner,et al. Numerical solution of the infinite-dimensional LQR problem and the associated Riccati differential equations , 2018, J. Num. Math..

[6] Gurij Ivanovich Marchuk,et al. Some application of splitting-up methods to the solution of mathematical physics problems , 1968 .

[7] J. S. Gibson,et al. The Riccati Integral Equations for Optimal Control Problems on Hilbert Spaces , 1979 .

[8] R. Nagel,et al. One-parameter semigroups for linear evolution equations , 1999 .

[9] H. Mena,et al. Fourier-splitting method for solving hyperbolic LQR problems , 2018 .

[10] G. Strang. On the Construction and Comparison of Difference Schemes , 1968 .

[11] V. Varadarajan. Lie groups, Lie algebras, and their representations , 1974 .

[12] A. Balakrishnan. Applied Functional Analysis , 1976 .