Title :
An input normal form homotopy for the L2 optimal model order reduction problem
Author :
Ge, Y. ; Collins, E.G., Jr. ; Watson, L.T. ; Davis, L.D.
Author_Institution :
Dept. of Comput. Sci. & Math., Virginia Polytech. Inst. & State Univ., Blacksburg, VA, USA
fDate :
6/1/1994 12:00:00 AM
Abstract :
In control system analysis and design, finding a reduced-order model, optimal in the L2 sense, to a given system model is a fundamental problem. The problem is very difficult without the global convergence of homotopy methods, and a homotopy based approach has been proposed. The issues are the number of degrees of freedom, the well posedness of the finite dimensional optimization problem, and the numerical robustness of the resulting homotopy algorithm. A homotopy algorithm based on the input normal form characterization of the reduced-order model is developed here and is compared with the homotopy algorithms based on Hyland and Bernstein´s optimal projection equations. The main conclusions are that the input normal form algorithm can be very efficient, but can also be very ill conditioned or even fail
Keywords :
control system analysis; control system synthesis; convergence; large-scale systems; optimal control; optimisation; L2 optimal model order reduction; control system analysi; control system design; degrees of freedom; finite dimensional optimization; input normal form homotopy; numerical robustness; optimal projection equations; reduced-order model; well posedness; Continuous time systems; Control system analysis; Convergence; Cost function; Equations; Linear algebra; NASA; Reduced order systems; Symmetric matrices; White noise;
Journal_Title :
Automatic Control, IEEE Transactions on
