Title :
Unified canonical forms for linear time-varying dynamical systems under D-similarity transformations. II
Author :
Zhu, J. ; Johnson, C.D.
Author_Institution :
Dept. of Electr. & Comput. Eng., Alabama Univ., Huntsville, AL, USA
Abstract :
For pt.I see ibid., p.74-81. The linear differential equation operators, D spaces, and D-similarity transformations introduced in pt.I, are used to establish a number of results for the analysis of time-varying linear dynamical systems. In particular, the concepts of D-characteristic equations (which include the well-known Riccati equation as a special case), essential D ( ED) eigenvalues, ED eigenvectors, and ED eigenspaces for vector and scalar time-varying linear systems are presented. Two spectral canonical forms for time-varying linear systems and four canonical D-similarity transformations that relate the classical companion canonical forms with the time-varying spectral canonical forms are developed. These canonical forms serve to unify the classical Jordan and diagonal canonical forms and the classical (generalized) Vandermonde matrix for the general class of time-varying linear systems
Keywords :
eigenvalues and eigenfunctions; linear differential equations; linear systems; transforms; D spaces; D-characteristic equations; D-similarity transformations; Jordan canonical forms; Riccati equation; Vandermonde matrix; diagonal canonical forms; dynamical systems; essential D eigenspaces; essential D eigenvalues; essential D eigenvectors; linear differential equation operators; scalar time-varying linear systems; spectral canonical forms; time-varying systems; unified canonical forms; vector systems; Artificial intelligence; Density estimation robust algorithm; Differential equations; Linear systems; Stability criteria; Time varying systems; Vectors;
Conference_Titel :
System Theory, 1989. Proceedings., Twenty-First Southeastern Symposium on
Conference_Location :
Tallahassee, FL
Print_ISBN :
0-8186-1933-3
DOI :
10.1109/SSST.1989.72434
