Add to ORKGWe desire to find a correlation matrix of a given rank that is as close as possible to an input matrix R, subject to the constraint that specified elements in must be zero. Our optimality criterion is the weighted Frobenius norm of the approximation error, and we use a constrained majorization algorithm to solve the problem. Although many correlation matrix approximation approaches have been proposed, this specific problem, with the rank specification and the constraints, has not been studied until now. We discuss solution feasibility, convergence, and computational effort. We also present several examples
Given a symmetric matrix what is the nearest correlation matrix, that is, the nearest symmetric posi...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
Correlation matrices have many applications, particularly in marketing and financial economics - suc...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
AbstractWe desire to find a correlation matrix R^ of a given rank that is as close as possible to an...
textabstractIn this paper a novel method is developed for the problem of finding a low-rank correlat...
A novel algorithm is developed for the problem of finding a low-rank correlation matrix nearest to a...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
Abstract. A novel algorithm is developed for the problem of finding a low-rank correlation matrix ne...
The nearest correlation matrix problem is to find a valid (positive semidefinite) correlation matrix...
This thesis presents new theoretical results and algorithms for two matrix problems with positive se...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
Given a symmetric matrix what is the nearest correlation matrix, that is, the nearest symmetric posi...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
Correlation matrices have many applications, particularly in marketing and financial economics - suc...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
AbstractWe desire to find a correlation matrix R^ of a given rank that is as close as possible to an...
textabstractIn this paper a novel method is developed for the problem of finding a low-rank correlat...
A novel algorithm is developed for the problem of finding a low-rank correlation matrix nearest to a...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
Abstract. A novel algorithm is developed for the problem of finding a low-rank correlation matrix ne...
The nearest correlation matrix problem is to find a valid (positive semidefinite) correlation matrix...
This thesis presents new theoretical results and algorithms for two matrix problems with positive se...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
Given a symmetric matrix what is the nearest correlation matrix, that is, the nearest symmetric posi...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
Correlation matrices have many applications, particularly in marketing and financial economics - suc...