WOS:000779567400001We propose an alternative method to solve large linear saddle point problems arising from computational sciences and engineering such as finite element approximations to Stokes problems, image reconstructions, tomography, genetics, statistics, and model order reductions for dynamical systems. Such problems have large sparse 2-by-2 block structure coefficient matrices with zero (2,2)-block matrix. A new technique is presented to solve saddle point problems with full row rank (2,1)-block matrix and nonzero right-hand side vector. By constructing a projection matrix and transforming the original problem into a least squares problem, a new reduced least squares problem is solved via the well-known iterative method LSMR. Numer...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
In this thesis, we consider the numerical solution of four kinds of linear systems: saddle-point pro...
We introduce an adaptive element-based domain decomposition (DD) method for solving saddle point pro...
We propose an alternative method to solve large linear saddle point problems arising from computatio...
WOS:000779988400002Saddle point linear systems arise in many applications in computational sciences ...
Null-space methods have long been used to solve large sparse n x n symmetric saddle point systems of...
Large linear systems of saddle point type arise in a wide variety of applications throughout computa...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This book provides essential lecture notes on solving large linear saddle-point systems, which arise...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
We propose a class of regularized Hermitian and skew-Hermitian splitting methods for the solution of...
AbstractIn this paper, we first present a class of structure-oriented hybrid two-stage iteration met...
We present a new algorithm that constructs a fill-reducing ordering for a special class of saddle po...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
In this thesis, we consider the numerical solution of four kinds of linear systems: saddle-point pro...
We introduce an adaptive element-based domain decomposition (DD) method for solving saddle point pro...
We propose an alternative method to solve large linear saddle point problems arising from computatio...
WOS:000779988400002Saddle point linear systems arise in many applications in computational sciences ...
Null-space methods have long been used to solve large sparse n x n symmetric saddle point systems of...
Large linear systems of saddle point type arise in a wide variety of applications throughout computa...
The finite element (FE) integration of the coupled consolidation equations requires the solution of ...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This book provides essential lecture notes on solving large linear saddle-point systems, which arise...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
We propose a class of regularized Hermitian and skew-Hermitian splitting methods for the solution of...
AbstractIn this paper, we first present a class of structure-oriented hybrid two-stage iteration met...
We present a new algorithm that constructs a fill-reducing ordering for a special class of saddle po...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
In this thesis, we consider the numerical solution of four kinds of linear systems: saddle-point pro...
We introduce an adaptive element-based domain decomposition (DD) method for solving saddle point pro...