Title :
Approximate solutions to H2 optimization problems with H2 and H∞ constraints
Author_Institution :
LNCC, CNPq, Rio de Janeiro, Brazil
Abstract :
In this paper a H2 optimal control problem is considered in which the controllers are constrained to satisfy prescribed upper bounds on the H2 and H∞ norms of several closed-loop transfer functions. A sequence of H2-cost/H2-constraint problems is presented which aims at generating approximate solutions to the original problem - this may be viewed as a generalization of the so-called Law-son algorithm for Tchebyche approximation. Each such H2/H2 problem has a unique rational solution which can be computed through line search and spectral factorization. Under appropriate assumptions, it is shown that the sequence of optimal cost values for the H2/H2 problems is increasing and bounded from above (hence, it is convergent) and that, whenever the corresponding sequence of solutions converges, it does so to the solution of the original problem.
Keywords :
H∞ control; H2 control; closed loop systems; matrix decomposition; optimisation; transfer functions; H∞ constraints; H2 constraint problem; H2 optimal control problem; H2 optimization problems; H2-cost problem; Law-son algorithm; Tchebyche approximation; closed-loop transfer functions; line search; optimal cost values; spectral factorization; Approximation algorithms; Approximation methods; Optimal control; Optimization; Search problems; Transfer functions; Upper bound; H∞/L1; H2-optimization; Linear systems; optimal control;
Conference_Titel :
Control Conference (ECC), 1997 European
Conference_Location :
Brussels
Print_ISBN :
978-3-9524269-0-6
