Title :
Spectral and inner-outer factorizations through the constrained Riccati equation
Author_Institution :
Math. Inst., Groningen Univ., Netherlands
fDate :
3/1/1994 12:00:00 AM
Abstract :
The topic of the paper is the spectral factorization problem for a proper rational matrix function of constant rank, but not necessarily maximal, on the extended imaginary axis. The problem is reduced to the computation of the stabilizing solution of a so-called constrained Riccati equation. The proof of the main result suggests a Schur-like algorithm applied to a singular matrix pencil
Keywords :
matrix algebra; Schur-like algorithm; constant rank; constrained Riccati equation; imaginary axis; inner-outer factorizations; rational matrix function; singular matrix pencil; spectral factorizations; Automatic control; Brushless DC motors; DC motors; Induction motors; Linear feedback control systems; Linearization techniques; Optimal control; Reluctance motors; Riccati equations; Torque;
Journal_Title :
Automatic Control, IEEE Transactions on
