This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equations in saddle-point form using a fill-reducing ordering technique with a direct solver. Row and column permutations partition the saddle-point matrix into a block structure constituting a priori pivots of order 1 and 2. The partitioned matrix is compressed by treating each nonzero block as a single entry, and a fill-reducing ordering is applied to the corresponding compressed graph. It is shown that, provided the saddle-point matrix satisfies certain criteria, a block LDLT factorization can be computed using the resulting pivot sequence without modification. Numerical results for a range of problems from practical applications using a modern ...
The performance of a sparse direct solver is dependent upon the pivot sequence that is chosen before...
We present a family of ordering algorithms that can be used as a preprocessing step prior to perform...
Abstract. Maximum weight matchings have become an important tool for solving highly indefinite unsym...
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...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Our goal is to solve a sparse skew-symmetric linear system efficiently. We propose a slight modifica...
Interior-point methods are among the most efficient approaches for solving large-scale nonlinear pro...
AbstractWe consider the LDLT factorization of sparse skew symmetric matrices. We see that the pivoti...
Analytic expressions for finding fill-in, the number of nonzero elements that change in value, and t...
Abstract Incomplete LU factorization preconditioning techniques often have difficulty on indefinite ...
We transform and partition the symmetric indefinite (saddle point) matrices into a block structure w...
Abstract. We investigate several ways to improve the performance of sparse LU factorization with par...
The performance of a sparse direct solver is dependent upon the pivot sequence that is chosen before...
We present a family of ordering algorithms that can be used as a preprocessing step prior to perform...
Abstract. Maximum weight matchings have become an important tool for solving highly indefinite unsym...
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...
\u3cp\u3eThis paper focuses on efficiently solving large sparse symmetric indefinite systems of line...
This paper focuses on efficiently solving large sparse symmetric indefinite systems of linear equati...
Abstract. Limited-memory incomplete Cholesky factorizations can provide robust precondi-tioners for ...
Our goal is to solve a sparse skew-symmetric linear system efficiently. We propose a slight modifica...
Interior-point methods are among the most efficient approaches for solving large-scale nonlinear pro...
AbstractWe consider the LDLT factorization of sparse skew symmetric matrices. We see that the pivoti...
Analytic expressions for finding fill-in, the number of nonzero elements that change in value, and t...
Abstract Incomplete LU factorization preconditioning techniques often have difficulty on indefinite ...
We transform and partition the symmetric indefinite (saddle point) matrices into a block structure w...
Abstract. We investigate several ways to improve the performance of sparse LU factorization with par...
The performance of a sparse direct solver is dependent upon the pivot sequence that is chosen before...
We present a family of ordering algorithms that can be used as a preprocessing step prior to perform...
Abstract. Maximum weight matchings have become an important tool for solving highly indefinite unsym...