We address the important field of large scale matrix based algorithms in control and model order reduction. Many important tools from theory and applications in systems theory have been widely ignored during the recent decades in the context of PDE constraint optimal control problems and simulation of electric circuits. Often this is due to the fact that large scale matrices are suspected to be unsolvable in large scale applications. Since around 2000 efficient low rank theory for matrix equation solvers exists for sparse and also data sparse systems. Unfortunately upto now only incomplete or experimental Matlab implementations of most of these solvers have existed. Here we aim on the implementation of these algorithms in a higher programmi...
We investigate model reduction of large-scale linear time-invariant systems in generalized state-sp...
Sparse-matrix solution is a dominant part of execution time in simulating VLSI circuits by a detaile...
Abstract. Computer simulations of realistic applications usually require solving a set of non-linear...
We address the important field of large scale matrix based algorithms in control and model order red...
Matrix Lyapunov and Riccati equations are an important tool in mathematical systems theory. They are...
Sparsity and parallel algorithms: two approaches to beat the curse of dimensionality. By Peter Benne...
It is important to have a fast, robust and scalable algorithm to solve a sparse linear system AX=B. ...
Efficiency improving implementation techniques for large scale matrix equation solver
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
LTI (Linear Time Invariant) systems arise frequently in different branches of engineering. This thes...
Solving a system of linear simultaneous equations representing an electrical circuit is one of the m...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
AbstractIn this paper we show how to improve the approximate solution of the large Sylvester equatio...
Sparse matrix operations dominate the cost of many scientific applications. In parallel, the perform...
We investigate model reduction of large-scale linear time-invariant systems in generalized state-sp...
Sparse-matrix solution is a dominant part of execution time in simulating VLSI circuits by a detaile...
Abstract. Computer simulations of realistic applications usually require solving a set of non-linear...
We address the important field of large scale matrix based algorithms in control and model order red...
Matrix Lyapunov and Riccati equations are an important tool in mathematical systems theory. They are...
Sparsity and parallel algorithms: two approaches to beat the curse of dimensionality. By Peter Benne...
It is important to have a fast, robust and scalable algorithm to solve a sparse linear system AX=B. ...
Efficiency improving implementation techniques for large scale matrix equation solver
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
LTI (Linear Time Invariant) systems arise frequently in different branches of engineering. This thes...
Solving a system of linear simultaneous equations representing an electrical circuit is one of the m...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
AbstractIn this paper we show how to improve the approximate solution of the large Sylvester equatio...
Sparse matrix operations dominate the cost of many scientific applications. In parallel, the perform...
We investigate model reduction of large-scale linear time-invariant systems in generalized state-sp...
Sparse-matrix solution is a dominant part of execution time in simulating VLSI circuits by a detaile...
Abstract. Computer simulations of realistic applications usually require solving a set of non-linear...