Title :
Accessory minimum problem of optimal periodic processes
Author_Institution :
American GNC Corp., Chatsworth, CA, USA
Abstract :
This paper presents a new approach for analyzing the accessory minimum problem of optimal periodic process. A stability preserving transformation is introduced which produces an LTI equivalent system to the periodic Hamiltonian. A linear matrix inequality (LMI) related to the equivalent system is then established. Since the Hamiltonian system of an optimal periodic process has the property that its monodromy matrix has a pair of coupled unit eigenvalues with the primary eigenvector along the extremal periodic trajectory, the matrix inequality is of a form that is similar to that of a singular linear quadratic problem. It is expected that investigating properties of this LMI will shed light to and enrich the second variation theory for optimal periodic processes
Keywords :
eigenvalues and eigenfunctions; matrix algebra; periodic control; stability; LTI equivalent system; accessory minimum problem; coupled unit eigenvalues; extremal periodic trajectory; linear matrix inequality; monodromy matrix; optimal periodic processes; periodic Hamiltonian; second variation theory; singular linear quadratic problem; stability preserving transformation; Constraint theory; Cost function; Differential equations; Eigenvalues and eigenfunctions; Lighting control; Linear matrix inequalities; Optimal control; Regulators; Riccati equations; Stability;
Conference_Titel :
American Control Conference, Proceedings of the 1995
Conference_Location :
Seattle, WA
Print_ISBN :
0-7803-2445-5
DOI :
10.1109/ACC.1995.532241
