AbstractPartitioning a sparse matrix A is a useful device employed by a number of sparse matrix techniques. An important problem that arises in connection with some of these methods is to determine the block structure of the Cholesky factor L of A, given the partitioned A. For the scalar case, the problem of determining the structure of L from A, so-called symbolic factorization, has been extensively studied. In this paper we study the generalization of this problem to the block case. The problem is interesting because an assumption relied on in the scalar case no longer holds; specifically, the product of two nonzero scalars is always nonzero, but the product of two nonnull sparse matrices may yield a zero matrix. Thus, applying the usual ...
jo s e pr,jua njo @ a c.up c.e du Abstract- In this paper we present an im-prove m e nt to o ur s e ...
In Part I of this this paper, we proposed a new parallel bidirectional algorithm, based on Cholesky...
International audienceSolving large sparse linear systems by iterative methods has often been quite ...
AbstractPartitioning a sparse matrix A is a useful device employed by a number of sparse matrix tech...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
We describe a parallel algorithm for finding the Cholesky factorization of a sparse symmetric posit...
Abstract. This paper presents the design and implementation of a memory scalable parallel symbolic f...
AbstractWhen large sparse symmetric systems of linear equations are solved by the Cholesky factoriza...
We develop an algorithm for computing the symbolic and numeric Cholesky factorization of a large sp...
Texte intégral accessible uniquement aux membres de l'Université de LorraineThis dissertation treats...
We describe a parallel algorithm for finding the fill that occurs when a sparse symmetric positive ...
The factorization method presented in this paper takes advantage of the special structures and prope...
Systems of linear equations of the form $Ax = b,$ where $A$ is a large sparse symmetric positive de...
W e present algorithms for the symbolic and numerical factorization phases in the direct solution o...
The design of compact data structures for representing the structure of the Cholesky factor L of a s...
jo s e pr,jua njo @ a c.up c.e du Abstract- In this paper we present an im-prove m e nt to o ur s e ...
In Part I of this this paper, we proposed a new parallel bidirectional algorithm, based on Cholesky...
International audienceSolving large sparse linear systems by iterative methods has often been quite ...
AbstractPartitioning a sparse matrix A is a useful device employed by a number of sparse matrix tech...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
We describe a parallel algorithm for finding the Cholesky factorization of a sparse symmetric posit...
Abstract. This paper presents the design and implementation of a memory scalable parallel symbolic f...
AbstractWhen large sparse symmetric systems of linear equations are solved by the Cholesky factoriza...
We develop an algorithm for computing the symbolic and numeric Cholesky factorization of a large sp...
Texte intégral accessible uniquement aux membres de l'Université de LorraineThis dissertation treats...
We describe a parallel algorithm for finding the fill that occurs when a sparse symmetric positive ...
The factorization method presented in this paper takes advantage of the special structures and prope...
Systems of linear equations of the form $Ax = b,$ where $A$ is a large sparse symmetric positive de...
W e present algorithms for the symbolic and numerical factorization phases in the direct solution o...
The design of compact data structures for representing the structure of the Cholesky factor L of a s...
jo s e pr,jua njo @ a c.up c.e du Abstract- In this paper we present an im-prove m e nt to o ur s e ...
In Part I of this this paper, we proposed a new parallel bidirectional algorithm, based on Cholesky...
International audienceSolving large sparse linear systems by iterative methods has often been quite ...