Paper Info
Title
An Iteration for Indefinite Systems and Its Application to the Navier--Stokes Equations
Abstract
For large sparse systems of linear equations iterative solution techniques are attractive. In this paper we propose and examine the convergence of an iterative method for an important class of nonsymmetric and indefinite coefficient matrices based on the use of an indefinite and symmetric preconditioner. We apply our technique to the linearized Navier--Stokes equations (the Oseen equations).
Year
DOI
Venue
1998
10.1137/S106482759529382X
SIAM Journal on Scientific Computing
Keywords
Field
DocType
stokes equation,oseen equation,symmetric preconditioner,indefinite coefficient,indefinite systems,iterative solution technique,linear equation,large sparse system,stokes equations,important class,linearized navier,iterative method,linear equations,linear systems,iterative methods,iteration method
Linear algebra,Oseen equations,Mathematical optimization,Preconditioner,System of linear equations,Matrix (mathematics),Mathematical analysis,Iterative method,Numerical analysis,Mathematics,Navier–Stokes equations
Journal
Volume
Issue
ISSN
19
2
1064-8275
Citations 
PageRank 
References 
56
12.00
0
Authors
2
Name
Order
Citations
PageRank
Gene H. Golub12558856.07
Andrew J. Wathen279665.47