论文信息 - A positive definiteness preserving discretization method for Lyapunov differential equations

A positive definiteness preserving discretization method for Lyapunov differential equations

Periodic Lyapunov differential equations can be used to formulate robust optimal periodic control problems for nonlinear systems. Typically, the added Lyapunov states are discretized in the same manner as the original states. This straightforward technique fails to guarantee conservation of positive-semidefiniteness of the Lyapunov matrix under discretization. This paper describes a discretization method, coined PDPLD, that does come with such a guarantee. The applicability is demonstrated at hand of a tutorial example, and is specifically suited for direct collocation methods.

Moritz Diehl | Joris Gillis | M. Diehl | Joris Gillis

[1] Moritz Diehl,et al. CasADi -- A symbolic package for automatic differentiation and optimal control , 2012 .

[2] H. Bock,et al. A Multiple Shooting Algorithm for Direct Solution of Optimal Control Problems , 1984 .

[3] Mi-Ching Tsai,et al. Robust and Optimal Control , 2014 .

[4] Carol S. Woodward,et al. Enabling New Flexibility in the SUNDIALS Suite of Nonlinear and Differential/Algebraic Equation Solvers , 2020, ACM Trans. Math. Softw..

[5] Fredrik Magnusson. Collocation methods in JModelica.org , 2012 .

[6] S. Kahne,et al. Optimal control: An introduction to the theory and ITs applications , 1967, IEEE Transactions on Automatic Control.

[7] Paolo Bolzern,et al. The periodic Lyapunov equation , 1988 .

[8] Moritz Diehl,et al. Robustness and stability optimization of power generating kite systems in a periodic pumping mode , 2010, 2010 IEEE International Conference on Control Applications.