Add to ORKGtextabstractIn this paper a novel method is developed for the problem of finding a low-rank correlation matrix nearest to a given correlation matrix. The method is based on majorization and therefore it is globally convergent. The method is computationally efficient, is straightforward to implement, and can handle arbitrary weights on the entries of the correlation matrix. A simulation study suggests that majorization compares favourably with competing approaches in terms of the quality of the solution within a fixed computational time. The problem of rank reduction of correlation matrices occurs when pricing a derivative dependent on a large number of assets, where the asset prices are modelled as correlated log-normal processes
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...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
A novel algorithm is developed for the problem of finding a low-rank correlation matrix nearest to a...
Abstract. A novel algorithm is developed for the problem of finding a low-rank correlation matrix ne...
textabstractGeometric optimisation algorithms are developed that efficiently find the nearest low-ra...
AbstractGeometric optimisation algorithms are developed that efficiently find the nearest low-rank c...
AbstractWe desire to find a correlation matrix R^ of a given rank that is as close as possible to an...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
For n-dimensional real-valued matrix A, the computation of nearest correlation matrix; that is, a sy...
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...
Correlation matrices have many applications, particularly in marketing and financial economics - suc...
We propose two numerical methods, namely the alternating block relaxation method and the alternating...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
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...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...
A novel algorithm is developed for the problem of finding a low-rank correlation matrix nearest to a...
Abstract. A novel algorithm is developed for the problem of finding a low-rank correlation matrix ne...
textabstractGeometric optimisation algorithms are developed that efficiently find the nearest low-ra...
AbstractGeometric optimisation algorithms are developed that efficiently find the nearest low-rank c...
AbstractWe desire to find a correlation matrix R^ of a given rank that is as close as possible to an...
We desire to find a correlation matrix of a given rank that is as close as possible to an input matr...
For n-dimensional real-valued matrix A, the computation of nearest correlation matrix; that is, a sy...
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...
Correlation matrices have many applications, particularly in marketing and financial economics - suc...
We propose two numerical methods, namely the alternating block relaxation method and the alternating...
AbstractLow-rank approximation of a correlation matrix is a constrained minimization problem that ca...
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...
An $n\times n$ correlation matrix has $k$ factor structure if its off-diagonal agrees with that of a...