Paper Info
Title
A Comparison of Subspace Methods for Sylvester Equations
Abstract
Sylvester equations AX \GammaX B = C play an important role in numerical linearalgebra. For example, they arise in the computation of invariant subspaces,in control problems, as linearizations of algebraic Riccati equations, and inthe discretization of partial differential equations. For small systems, directmethods are feasible. For large systems, iterative solution methods are available,like Krylov subspace methods.
Year
DOI
Venue
2001
10.1007/3-540-45346-6_49
Lecture Notes in Computer Science
Keywords
Field
DocType
subspace methods,sylvester equations,sylvester equation,numerical linear algebra,algebraic riccati equation,partial differential equation
Krylov subspace,Discretization,Applied mathematics,Discrete mathematics,Sylvester equation,Subspace topology,Mathematical analysis,Invariant subspace,Linear subspace,Invariant (mathematics),Numerical linear algebra,Mathematics
Conference
Volume
ISSN
ISBN
2179
0302-9743
3-540-43043-1
Citations 
PageRank 
References 
0
0.34
2
Authors
1
Name
Order
Citations
PageRank
Jan Brandts1545.96