AbstractCoarse grain parallel codes for solving sparse systems of linear algebraic equations can be developed in several different ways. The following procedure is suitable for some parallel computers. A preliminary reordering of the matrix is first applied to move as many zero elements as possible to the lower left corner. After that the matrix is partitioned into large blocks and the blocks in the lower left corner contain only zero elements. An attempt to obtain a good load-balance is carried out by allowing the diagonal blocks to be rectangular.While the algorithm based on the above ideas has good parallel properties, some stability problems may arise during the factorization because the pivotal search is restricted to the diagonal bloc...
Key words: finite element method, multifrontal solver, load balancing We work on direct methods to s...
Out-of-core sparse direct solvers reduce the amount of main memory needed to factorize and solve lar...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
AbstractCoarse grain parallel codes for solving sparse systems of linear algebraic equations can be ...
. The efficiency of solving sparse linear systems on parallel processors and more complex multiclust...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
We propose a hybrid sparse system solver for handling linear systems using algebraic domain decompos...
AbstractWe propose a hybrid sparse system solver for handling linear systems using algebraic domain ...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
In Part I of this this paper, we proposed a new parallel bidirectional algorithm, based on Cholesky...
of Dissertation October, 1995 This thesis presents research into parallel linear solvers for block-...
We present an overview of parallel direct methods for solving sparse systems of linear equations, fo...
Research is on-going that examines parallel direct block-diagonal-bordered sparse linear solvers for...
This thesis presents research into parallel linear solvers for block-diagonal-bordered sparse matric...
Key words: finite element method, multifrontal solver, load balancing We work on direct methods to s...
Out-of-core sparse direct solvers reduce the amount of main memory needed to factorize and solve lar...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...
AbstractCoarse grain parallel codes for solving sparse systems of linear algebraic equations can be ...
. The efficiency of solving sparse linear systems on parallel processors and more complex multiclust...
Gary Kumfert and Alex Pothen have improved the quality and run time of two ordering algorithms for m...
We propose a hybrid sparse system solver for handling linear systems using algebraic domain decompos...
AbstractWe propose a hybrid sparse system solver for handling linear systems using algebraic domain ...
Abstract. Numerical linear algebra and combinatorial optimization are vast subjects; as is their int...
The need to solve large sparse linear systems of equations efficiently lies at the heart of many app...
In Part I of this this paper, we proposed a new parallel bidirectional algorithm, based on Cholesky...
of Dissertation October, 1995 This thesis presents research into parallel linear solvers for block-...
We present an overview of parallel direct methods for solving sparse systems of linear equations, fo...
Research is on-going that examines parallel direct block-diagonal-bordered sparse linear solvers for...
This thesis presents research into parallel linear solvers for block-diagonal-bordered sparse matric...
Key words: finite element method, multifrontal solver, load balancing We work on direct methods to s...
Out-of-core sparse direct solvers reduce the amount of main memory needed to factorize and solve lar...
A popular class of preconditioners is known as incomplete factorizations. They can be thought of as ...