Title :
Minimization of the L∞-induced norm for sampled-data systems
Author :
Bamieh, Bassam ; Dahleh, Munther A. ; Pearson, J. Boyd
Author_Institution :
Dept. of Electr. & Comput. Eng., Illinois Univ., Urbana, IL, USA
fDate :
5/1/1993 12:00:00 AM
Abstract :
It is shown that given any degree of accuracy, there exists a standard discrete-time l1 problem that can be determined a priori whose solution yields a controller that is almost optimal in terms of the hybrid L∞-induced norm. This is accomplished by first converting the hybrid system into an equivalent infinite-dimensional discrete-time system using the lifting technique in continuous time, and then approximating the infinite-dimensional parts of the system which model the intersample dynamics. A thorough analysis of the approximation procedure is presented, and it is shown that it is convergent at the rate of 1/n . Explicit bounds that are independent of the controller are obtained to characterize the approximation. It is also shown that the geometry of the induced norm for the sampled-data problem is different from that of the standard l1 norm, and hence there might not exist a linear isometry that maps the sampled-data problem exactly to a standard discrete-time problem
Keywords :
approximation theory; minimisation; multidimensional systems; optimal control; sampled data systems; L∞-induced norm; approximation procedure; convergence rate; discrete-time l1 problem; infinite-dimensional discrete-time system; minimisation; optimal control; sampled-data systems; Control systems; Design optimization; Digital control; Geometry; H infinity control; Optimal control; Time varying systems; Uncertainty; Yttrium;
Journal_Title :
Automatic Control, IEEE Transactions on
