AbstractWe present a new algorithm for constructing the elimination tree for the Cholesky factor of an irreducible, symmetric, positive definite matrix A. The new algorithm runs in time O(m + nα(n, n)); the previous best asymptotic algorithm runs in time O(mα(m, n)), where m is the number of nonzero elements in the n × n matrix A and α(m, n) is a functional inverse of Ackermann's function (and grows very slowly). Thus the new algorithm is a small asymptotic improvement over the previous best algorithm if the density of the matrix is greater than O(n), and is the asymptotic equivalent of the previous algorithm otherwise. The new algorithm has an unusual form: reduce the graph corresponding to matrix A into a minimum spanning tree (MST) by an...
In the direct solution of sparse symmetric and positive definite lin-ear systems, finding an orderin...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...
In this paper we study the complexity of matrix elimination over finite fields in terms of row opera...
AbstractWe present a new algorithm for constructing the elimination tree for the Cholesky factor of ...
We describe a parallel algorithm for finding the Cholesky factorization of a sparse symmetric posit...
For the solution of symmetric linear systems, the classical Cholesky method has proved to be difficu...
We develop an algorithm for computing the symbolic and numeric Cholesky factorization of a large sp...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
[[abstract]]In the direct solution of sparse symmetric and positive definite linear systems, finding...
International audienceThe elimination tree for unsymmetric matrices is a recent model playing import...
The modified Cholesky decomposition is one of the standard tools in various areas of mathematics for...
The design of compact data structures for representing the structure of the Cholesky factor L of a s...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
AbstractStarting from the Strassen method for rapid matrix multiplication and inversion as well as f...
In the direct solution of sparse symmetric and positive definite lin-ear systems, finding an orderin...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...
In this paper we study the complexity of matrix elimination over finite fields in terms of row opera...
AbstractWe present a new algorithm for constructing the elimination tree for the Cholesky factor of ...
We describe a parallel algorithm for finding the Cholesky factorization of a sparse symmetric posit...
For the solution of symmetric linear systems, the classical Cholesky method has proved to be difficu...
We develop an algorithm for computing the symbolic and numeric Cholesky factorization of a large sp...
Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm comp...
. Given a symmetric and not necessarily positive definite matrix A, a modified Cholesky algorithm co...
[[abstract]]In the direct solution of sparse symmetric and positive definite linear systems, finding...
International audienceThe elimination tree for unsymmetric matrices is a recent model playing import...
The modified Cholesky decomposition is one of the standard tools in various areas of mathematics for...
The design of compact data structures for representing the structure of the Cholesky factor L of a s...
As sequential computers seem to be approaching their limits in CPU speed there is increasing intere...
AbstractStarting from the Strassen method for rapid matrix multiplication and inversion as well as f...
In the direct solution of sparse symmetric and positive definite lin-ear systems, finding an orderin...
This note concerns the computation of the Cholesky factorization of a symmetric and positive defini...
In this paper we study the complexity of matrix elimination over finite fields in terms of row opera...