Add to ORKGWe call a matrix triadic if it has no more than two nonzero off-diagonal elements in any column. A symmetric tridiagonal matrix is a special case. In this paper we consider $LXL^T$ factorizations of symmetric triadic matrices, where $L$ is unit lower triangular and $X$ is diagonal, block diagonal with $1\!\times\!1$ and $2\!\times\!2$ blocks, or the identity with $L$ lower triangular. We prove that with diagonal pivoting, the $LXL^T$ factorization of a symmetric triadic matrix is sparse, study some pivoting algorithms, discuss their growth factor and performance, analyze their stability, and develop perturbation bounds. These factorizations are useful in computing inertia, in solving linear systems of equations, and in determinin...
An algorithm is presented to compute a triangular factorization and the inertia of a symmetric matri...
AbstractAhac and Olesky have shown that by using the most diagonal-dominat column as a pivot element...
AbstractWe consider the LDLT factorization of sparse skew symmetric matrices. We see that the pivoti...
We consider the $LBL^T$ factorization of a symmetric matrix where $L$ is unit lower triangular and ...
AbstractFor symmetric indefinite tridiagonal matrices, block LDLT factorization without interchanges...
SUMMARY The LBL T factorization of Bunch for solving linear systems involving a symmetric indefinite...
AbstractThe existence of block LU factorization without pivoting for complex symmetric block tridiag...
AbstractLet LDLt be the triangular factorization of an unreduced symmetric tridiagonal matrix T−τI. ...
AbstractThe LDLT factorization of a symmetric indefinite matrix, although efficient computationally,...
AbstractThe same number of parameters determine a tridiagonal matrix T and its triangular factors L,...
This thesis focuses on the Cholesky-related factorizations of symmetric matrices and their applicati...
AbstractThe four matrices L0U0L1U1 at the end of the title are triangular with ones on their main di...
AbstractCustomizable triangular factorizations of matrices find their applications in computer graph...
AbstractNon-symmetric and symmetric twisted block factorizations of block tridiagonal matrices are d...
AbstractTridiagonal matrices arise in a large variety of applications. Most of the time they are dia...
An algorithm is presented to compute a triangular factorization and the inertia of a symmetric matri...
AbstractAhac and Olesky have shown that by using the most diagonal-dominat column as a pivot element...
AbstractWe consider the LDLT factorization of sparse skew symmetric matrices. We see that the pivoti...
We consider the $LBL^T$ factorization of a symmetric matrix where $L$ is unit lower triangular and ...
AbstractFor symmetric indefinite tridiagonal matrices, block LDLT factorization without interchanges...
SUMMARY The LBL T factorization of Bunch for solving linear systems involving a symmetric indefinite...
AbstractThe existence of block LU factorization without pivoting for complex symmetric block tridiag...
AbstractLet LDLt be the triangular factorization of an unreduced symmetric tridiagonal matrix T−τI. ...
AbstractThe LDLT factorization of a symmetric indefinite matrix, although efficient computationally,...
AbstractThe same number of parameters determine a tridiagonal matrix T and its triangular factors L,...
This thesis focuses on the Cholesky-related factorizations of symmetric matrices and their applicati...
AbstractThe four matrices L0U0L1U1 at the end of the title are triangular with ones on their main di...
AbstractCustomizable triangular factorizations of matrices find their applications in computer graph...
AbstractNon-symmetric and symmetric twisted block factorizations of block tridiagonal matrices are d...
AbstractTridiagonal matrices arise in a large variety of applications. Most of the time they are dia...
An algorithm is presented to compute a triangular factorization and the inertia of a symmetric matri...
AbstractAhac and Olesky have shown that by using the most diagonal-dominat column as a pivot element...
AbstractWe consider the LDLT factorization of sparse skew symmetric matrices. We see that the pivoti...