The polar decomposition of an $m \times n$ matrix $A$ of full rank, where $m \geqq n$, can be computed using a quadratically convergent algorithm of Higham [SIAM J. Sci. Statist. Comput., 7(1986), pp. 1160–1174]. The algorithm is based on a Newton iteration involving a matrix inverse. It is shown how, with the use of a preliminary complete orthogonal decomposition, the algorithm can be extended to arbitrary $A$. The use of the algorithm to compute the positive semidefinite square root of a Hermitian positive semidefinite matrix is also described. A hybrid algorithm that adaptively switches from the matrix inversion based iteration to a matrix multiplication based iteration due to Kovarik, and to Björck and Bowie, is formulated. The decision...
We present methods for computing the generalized polar decomposition of a matrix based on the dynami...
Abstract. The symmetric orthogonalization, which is obtained from the polar decomposition of a matri...
The complexity of performing matrix computations, such as solving a linear system, inverting a nonsi...
The polar decomposition of an $m x n$ matrix $A$ of full rank, where $m \geq n$, can be computed us...
The polar decomposition of an m x n matrix A of full rank, where m is greater than or equal to n, ca...
The polar decomposition A = UH of a rectangular matrix A, where U is unitary and H is Hermitian posi...
A quadratically convergent Newton method for computing the polar decomposition of a full-rank matrix...
Abstract. It is shown that an acceleration parameter derived from the Frobenius norm makes Newton’s ...
In the paper we review the numerical methods for computing the polar decomposition of a matrix. Nume...
This is the published version, also available here: http://dx.doi.org/10.1137/070699895.We propose a...
.In the paper we review the numerical methods for computing the polar decomposition of a matrix. Num...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
We introduce a backward stable algorithm for computing the CS decomposition of a partitioned $2n \ti...
We present methods for computing the generalized polar decomposition of a matrix based on the dynami...
Abstract. The symmetric orthogonalization, which is obtained from the polar decomposition of a matri...
The complexity of performing matrix computations, such as solving a linear system, inverting a nonsi...
The polar decomposition of an $m x n$ matrix $A$ of full rank, where $m \geq n$, can be computed us...
The polar decomposition of an m x n matrix A of full rank, where m is greater than or equal to n, ca...
The polar decomposition A = UH of a rectangular matrix A, where U is unitary and H is Hermitian posi...
A quadratically convergent Newton method for computing the polar decomposition of a full-rank matrix...
Abstract. It is shown that an acceleration parameter derived from the Frobenius norm makes Newton’s ...
In the paper we review the numerical methods for computing the polar decomposition of a matrix. Nume...
This is the published version, also available here: http://dx.doi.org/10.1137/070699895.We propose a...
.In the paper we review the numerical methods for computing the polar decomposition of a matrix. Num...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental m...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
The symmetric eigenvalue decomposition and the singular value decomposition (SVD) are fundamental ma...
We introduce a backward stable algorithm for computing the CS decomposition of a partitioned $2n \ti...
We present methods for computing the generalized polar decomposition of a matrix based on the dynami...
Abstract. The symmetric orthogonalization, which is obtained from the polar decomposition of a matri...
The complexity of performing matrix computations, such as solving a linear system, inverting a nonsi...