Title :
Hybrid LQ-optimization using dynamic programming
Author :
Azhmyakov, V. ; Galvan-Guerra, R. ; Egerstedt, M.
Author_Institution :
Dept. de Control Automatico, CINVESTAV, Mexico City, Mexico
Abstract :
In this paper we study the linear quadratic optimal control problem for linear hybrid systems in which transitions between different discrete locations occur autonomously when the continuous state intersects given switching surfaces. In particular, we make an explicit connection between the newly developed, Pontryagin-type Hybrid Maximum Principle and the Bellman Dynamic Programming approach. As a consequence, we extend the classic Riccati-formalism, derive the associated Riccati-type equations, and prove the discontinuity of the full ldquohybridrdquo Riccati matrix. Finally, we discuss some computational aspects of the obtained theoretical results and propose a numerical algorithm in the framework of an optimal feedback control law.
Keywords :
Riccati equations; continuous systems; dynamic programming; feedback; linear quadratic control; matrix algebra; maximum principle; Bellman dynamic programming approach; Pontryagin-type hybrid maximum principle; Riccati-type equations; classic Riccati-formalism; continuous state; discrete locations; hybrid LQ-optimization; hybrid Riccati matrix; linear hybrid systems; linear quadratic optimal control; numerical algorithm; optimal feedback control law; switching surfaces; Automatic control; Computational complexity; Control systems; Convergence of numerical methods; Dynamic programming; Explosions; Feedback control; Linear systems; Optimal control; Riccati equations;
Conference_Titel :
American Control Conference, 2009. ACC '09.
Conference_Location :
St. Louis, MO
Print_ISBN :
978-1-4244-4523-3
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2009.5160100
