Title :
Multiobjective H2/H∞ control
Author :
Scherer, Carsten W.
Author_Institution :
Math. Inst., Wurzburg Univ., Germany
fDate :
6/1/1995 12:00:00 AM
Abstract :
For a linear time-invariant system with several disturbance inputs and controlled outputs, we show how to minimize the nominal H2-norm performance in one channel while keeping bounds on the H2-norm or H∞-norm performance (implying robust stability) in the other channels. This multiobjective H2 /H∞-problem in an infinite dimensional space is reduced to sequences of finite dimensional convex optimization problems. We show how to compute the optimal value and how to numerically detect the existence of a rational optimal controller. If it exists, we reveal how the novel trick of optimizing the trace norm of the Youla parameter over certain convex constraints allows one to design a nearly optimal controller whose Youla parameter is of the same order as the optimal one
Keywords :
H∞ control; control system analysis; linear systems; multidimensional systems; optimisation; robust control; H∞-norm performance; H2-norm performance; Youla parameter; bounds; convex constraints; finite dimensional convex optimization; infinite dimensional space; linear time-invariant system; multiobjective H2/H∞ control; rational optimal controller; robust stability; Control systems; Frequency dependence; Hydrogen; Mechanical engineering; Optimal control; Pareto analysis; Riccati equations; Robustness; Size control; Upper bound;
Journal_Title :
Automatic Control, IEEE Transactions on
