The characterization of polynomials whose zeros lie in certain algebraic domains (and the unification of the ideas of Hermite and Lyapunov) is the basis for developing finite algorithms for the solution of linear matrix equations. Particular attention is given to equations PA + A'P = Q (the Lyapunov equation) and P - A'PA = Q the (discrete Lyapunov equation). The Lyapunov equation appears in several areas of control theory such as stability theory, optimal control (evaluation of quadratic integrals), stochastic control (evaluation of covariance matrices) and in the solution of the algebraic Riccati equation using Newton's method
The matrix equation SA+A*S=S*B*BS is studied, under the assumption that (A, B*) is controllable, but...
This article is concerned with the efficient numerical solution of the Lyapunov equation A(T) X + XA...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...
A study is done of solution methods for Linear Matrix Equations including Lyapunov's equation, using...
The matrix equation A'P + PA = -Q arises when the direct method of Lyapunov is used to analyse the s...
AbstractAn algebraic viewpoint permits the formulation of necessary and sufficient conditions for th...
Given the square matrices A, B, D, E and the matrix C of conforming dimensions, we consider the line...
A two-variable polynomial approach to solve the one-variable polynomial Lyapunov and Sylvester equat...
AbstractLyapunov and Sylvester equations play an important role in linear systems theory. This paper...
AbstractThe matrix equation ∑∑fikAiXBk = C is discussed, based on the algebraic approach of Djaferis...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
A two-variable polynomial approach to solve the one-variable polynomial Lyapunov equation is propose...
Matrix equations have been studied by Mathematicians for many years. Interest in them has grown due ...
AbstractLet B and Q be real n × n matrices. It is well known that the discrete Lyapunov matrix equat...
Includes bibliographical references (pages 100-103).This dissertation deals with numerical solutions...
The matrix equation SA+A*S=S*B*BS is studied, under the assumption that (A, B*) is controllable, but...
This article is concerned with the efficient numerical solution of the Lyapunov equation A(T) X + XA...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...
A study is done of solution methods for Linear Matrix Equations including Lyapunov's equation, using...
The matrix equation A'P + PA = -Q arises when the direct method of Lyapunov is used to analyse the s...
AbstractAn algebraic viewpoint permits the formulation of necessary and sufficient conditions for th...
Given the square matrices A, B, D, E and the matrix C of conforming dimensions, we consider the line...
A two-variable polynomial approach to solve the one-variable polynomial Lyapunov and Sylvester equat...
AbstractLyapunov and Sylvester equations play an important role in linear systems theory. This paper...
AbstractThe matrix equation ∑∑fikAiXBk = C is discussed, based on the algebraic approach of Djaferis...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
A two-variable polynomial approach to solve the one-variable polynomial Lyapunov equation is propose...
Matrix equations have been studied by Mathematicians for many years. Interest in them has grown due ...
AbstractLet B and Q be real n × n matrices. It is well known that the discrete Lyapunov matrix equat...
Includes bibliographical references (pages 100-103).This dissertation deals with numerical solutions...
The matrix equation SA+A*S=S*B*BS is studied, under the assumption that (A, B*) is controllable, but...
This article is concerned with the efficient numerical solution of the Lyapunov equation A(T) X + XA...
A wide variety of problems in systems and control theory can be cast or recast as convex problems th...