A recursive Schur-based solution of the four-block problem

Author

Constantinescu, Tiberiu ; Sayed, Ali H. ; Kailath, Thomas

Author_Institution

Programs in Math. Sci., Texas Univ., Richardson, TX, USA

Volume

39

Issue

7

fYear

1994

fDate

7/1/1994 12:00:00 AM

Firstpage

1476

Lastpage

1481

Abstract

We describe a new solution to the four-block problem using the method of generalized Schur analysis. We first reduce the general problem to a simpler one by invoking a coprime factorization with a block-diagonal inner matrix. Then, using convenient spectral factorizations, we are able to parameterize the unknown entry in terms of a Schur-type matrix function, which is shown to satisfy a finite number of interpolation conditions of the Hermite-Fejer type. All possible interpolating functions are then determined via a simple recursive procedure that constructs a transmission-line (or lattice) cascade of elementary J-lossless sections. This also leads to a parameterization of all solutions of the four-block problem in terms of a linear fractional transformation

Keywords

interpolation; matrix algebra; optimal control; state-space methods; H^∞ control; Hermite-Fejer type; J-lossless; Schur-type matrix function; block diagonal inner matrix; coprime factorization; four block problem; generalized Schur analysis; interpolation conditions; linear fractional transformation; parameterization; recursive Schur-based solution; spectral factorizations; state space structure; Centralized control; Gold; Information systems; Interpolation; Lattices; Propagation losses; Transfer functions; Transmission line matrix methods; Transmission lines; Upper bound;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/9.299639

Filename

299639