We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matrix equations that arises, for instance, in linear-quadratic infinite time horizon optimal control. We focus on small-scale, dense problems. Via a Cayley transformation, the problem is transformed to the discrete-time case, and the structural infinite eigenvalues of the associated matrix pencil are deflated. The deflated problem is associated with a symplectic pencil with several Jordan blocks of eigenvalue 1 and even size, which arise from the nontrivial Kronecker chains at infinity of the original problem. For the solution of this modified problem, we use the structure-preserving doubling algorithm. Implementation issues such as the choice of...
In this paper, we introduce the doubling transformation, a structure-preserving transformation for s...
AbstractWe consider the solution of large-scale algebraic Riccati equations with numerically low-ran...
We give several different formulations for the discrete-time linear-quadratic control problem in ter...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
We discuss the numerical solution of structured generalized eigenvalue problems that arise from line...
Working title was “Numerical Computation of Deflating Subspaces of Embedded Hamiltonian and Symplect...
In this master’s thesis we adapt recent results on optimal control of continuous-time linear differe...
Abstract. In this paper we propose a structured doubling algorithm for solving discrete-time algebra...
Abstract. We discuss the numerical solution of structured generalized eigenvalue problems that arise...
This chapter concerns the treatment of the most recent and advanced algorithms for solving algebraic...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
Abstract. In this paper, we introduce the doubling transformation, a structure-preserving transforma...
Current and future directions in the development of numerical methods and numerical software for con...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
In this paper, we introduce the doubling transformation, a structure-preserving transformation for s...
AbstractWe consider the solution of large-scale algebraic Riccati equations with numerically low-ran...
We give several different formulations for the discrete-time linear-quadratic control problem in ter...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
We discuss the numerical solution of structured generalized eigenvalue problems that arise from line...
Working title was “Numerical Computation of Deflating Subspaces of Embedded Hamiltonian and Symplect...
In this master’s thesis we adapt recent results on optimal control of continuous-time linear differe...
Abstract. In this paper we propose a structured doubling algorithm for solving discrete-time algebra...
Abstract. We discuss the numerical solution of structured generalized eigenvalue problems that arise...
This chapter concerns the treatment of the most recent and advanced algorithms for solving algebraic...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
Abstract. In this paper, we introduce the doubling transformation, a structure-preserving transforma...
Current and future directions in the development of numerical methods and numerical software for con...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
In this paper, we introduce the doubling transformation, a structure-preserving transformation for s...
AbstractWe consider the solution of large-scale algebraic Riccati equations with numerically low-ran...
We give several different formulations for the discrete-time linear-quadratic control problem in ter...