Title of article
A Faddeev sequence method for solving Lyapunov and Sylvester equations Original Research Article
Author/Authors
Bernard Hanzon، نويسنده , , Ralf L. M. Peeters، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1996
Pages
30
From page
401
To page
430
Abstract
Lyapunov and Sylvester equations play an important role in linear systems theory. This paper deals with a method of solving such equations of the form AP + PB = K and P − APB = K with A set membership, variant Rm × m, B set membership, variant Rn × n, and P, K set membership, variant Rm × n, by exploiting the matrix-algebra structure of the problem. No use is made of Kronecker products and the largest matrices occurring in the algorithms are of sizes m × m, n × n, and m × n. The Faddeev method for matrix inversion lies at the very heart of the algorithms presented. It occurs on several levels of the problem: for the matrices A and B and for the Lyapunov and Sylvester operators. The resulting algorithms are capable of solving the equations in a finite number of recursion steps. They are very much apt for symbolic calculation. It is shown how a solution can be quickly obtained for an equation with an arbitrary right-hand side K, provided a solution is known for a right-hand side xyT of rank 1, where (A, x) and (BT, y) are reachable pairs. The concept of a Faddeev reachability matrix introduced here turns out to be very useful. It establishes a close connection between the controller canonical (companion) form of a reachable pair (A, b) and the Faddeev sequence of A. If A is already on controller form, then its Faddeev sequence takes on an especially simple form. Also in the symmetric case where A = BT, many important simplifications arise. For this case alternative algorithms that require less iterations are developed. The paper concludes with some examples concerning the symbolic solution of the Lyapunov equation AP + PAT = bbT with (A, b) on controller form, showing the potential of the algorithms.
Journal title
Linear Algebra and its Applications
Serial Year
1996
Journal title
Linear Algebra and its Applications
Record number
821752
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