Title :
On computing the eigenvalues of a symplectic pencil
Author_Institution :
Dept. of Electr. & Comput. Eng., Concordia Univ., Montreal, Que., Canada
Abstract :
The author presents an algorithm for computing the eigenvalues of a symplectic pencil that arises in one of the commonly used approaches for solving the discrete-time algebraic Riccati equation. The algorithm is numerically efficient and reliable in that it employs only orthogonal transformations and makes use of the structure of the symplectic pencil. It requires about one-fourth the number of floating point operations that the QZ algorithm uses to compute the eigenvalues of the pencil directly. The proposed method can be regarded as being analogous for the case of symplectic pencils to the method developed by C. Van Loan (1984) for computing the eigenvalues of Hamiltonian matrices
Keywords :
discrete time systems; eigenvalues and eigenfunctions; matrix algebra; algorithm; discrete-time algebraic Riccati equation; eigenvalues; floating point operations; orthogonal transformations; symplectic matrix; symplectic pencil; Councils; Eigenvalues and eigenfunctions; Optimal control; Reliability engineering; Riccati equations; Tin;
Conference_Titel :
Decision and Control, 1992., Proceedings of the 31st IEEE Conference on
Conference_Location :
Tucson, AZ
Print_ISBN :
0-7803-0872-7
DOI :
10.1109/CDC.1992.371096
