International audience—We study the design of minimum variance portfolio when asset returns follow a low rank factor model. Using results from random matrix theory, an optimal shrinkage approach for the isolated eigenvalues of the covariance matrix is developed. The proposed portfolio optimization strategy is shown to have good performance on synthetic data but not always on real data sets. This leads us to refine the data model by considering time correlation between samples. By updating the shrinkage of the isolated eigenvalues accounting for the unknown time correlation, our portfolio optimization method is shown to have improved performance and achieves lower risk values than competing methods on real financial data sets
URL des Documents de travail : https://centredeconomiesorbonne.univ-paris1.fr/documents-de-travail-d...
According to recent findings [1,2], empirical covariance matrices deduced from financial return ser...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...
International audience—We study the design of minimum variance portfolio when asset returns follow a...
International audienceWe study the design of portfolios under a minimum risk criterion. The performa...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
Abstract—We study the design of portfolios under a minimum risk criterion. The performance of the op...
In modern portfolio theory, the covariance matrices of portfolio asset returns are always needed for...
Financial crises are typically characterized by highly positively correlated asset returns due to th...
We present a completely automated optimization strategy which combines the classical Markowitz mean...
International audienceThis paper presents how the most recent improvements made on covariance matrix...
We investigate the asset allocation optimization under the time-varying high frequency global minimu...
In dynamic minimum variance portfolio, we study the impact of the sequence of covariance matrices ta...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
A covariance matrix is an important parameter in many computational applications, such as quantitati...
URL des Documents de travail : https://centredeconomiesorbonne.univ-paris1.fr/documents-de-travail-d...
According to recent findings [1,2], empirical covariance matrices deduced from financial return ser...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...
International audience—We study the design of minimum variance portfolio when asset returns follow a...
International audienceWe study the design of portfolios under a minimum risk criterion. The performa...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
Abstract—We study the design of portfolios under a minimum risk criterion. The performance of the op...
In modern portfolio theory, the covariance matrices of portfolio asset returns are always needed for...
Financial crises are typically characterized by highly positively correlated asset returns due to th...
We present a completely automated optimization strategy which combines the classical Markowitz mean...
International audienceThis paper presents how the most recent improvements made on covariance matrix...
We investigate the asset allocation optimization under the time-varying high frequency global minimu...
In dynamic minimum variance portfolio, we study the impact of the sequence of covariance matrices ta...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
A covariance matrix is an important parameter in many computational applications, such as quantitati...
URL des Documents de travail : https://centredeconomiesorbonne.univ-paris1.fr/documents-de-travail-d...
According to recent findings [1,2], empirical covariance matrices deduced from financial return ser...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...