We propose a novel dynamic approach to forecast the weights of the global minimum variance portfolio (GMVP). The GMVP weights are the population coefficients of a linear regression of a benchmark return on a vector of return differences. This representation enables us to derive a consistent loss function from which we can infer the optimal GMVP weights without imposing any distributional assumptions on the returns. In order to capture time variation in the returns’ conditional covariance structure, we model the portfolio weights through a recursive least squares (RLS) scheme as well as by generalized autoregressive score (GAS) type dynamics. Sparse parameterizations combined with targeting towards nonlinear shrinkage estimates of the long-r...
Considering the shortcomings of the traditional sample covariance matrix estimation, this paper prop...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...
The model-free exponential smoothing (ES) approach is a simple and robust way to make forecasts of r...
This thesis addresses the modeling and prediction of portfolio weights in high-dimensional applicati...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
We propose direct multiple time series models for predicting high dimensional vectors of observable ...
This paper studies the out of sample risk reduction of global minimum variance portfolio. The analys...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
This research uses four different methods of variance-covariance estimation namely Traditional, Trad...
We estimate the global minimum variance (GMV) portfolio in the high-dimensional case using results f...
This paper studies the performance of the Global Minimum Variance Portfolio (GMV Portfolio) construc...
We present a completely automated optimization strategy which combines the classical Markowitz mean...
Shrinkage estimators of the covariance matrix are known to improve the stability over time of the gl...
The paper studies the differences in risk reduction among global minimum variance portfolios (GMVPs)...
We use the Minimum Regularised Covariance Determinant Estimator (MRCD) to limit weights’ misspecific...
Considering the shortcomings of the traditional sample covariance matrix estimation, this paper prop...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...
The model-free exponential smoothing (ES) approach is a simple and robust way to make forecasts of r...
This thesis addresses the modeling and prediction of portfolio weights in high-dimensional applicati...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
We propose direct multiple time series models for predicting high dimensional vectors of observable ...
This paper studies the out of sample risk reduction of global minimum variance portfolio. The analys...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
This research uses four different methods of variance-covariance estimation namely Traditional, Trad...
We estimate the global minimum variance (GMV) portfolio in the high-dimensional case using results f...
This paper studies the performance of the Global Minimum Variance Portfolio (GMV Portfolio) construc...
We present a completely automated optimization strategy which combines the classical Markowitz mean...
Shrinkage estimators of the covariance matrix are known to improve the stability over time of the gl...
The paper studies the differences in risk reduction among global minimum variance portfolios (GMVPs)...
We use the Minimum Regularised Covariance Determinant Estimator (MRCD) to limit weights’ misspecific...
Considering the shortcomings of the traditional sample covariance matrix estimation, this paper prop...
Shrinkage estimators of the covariance matrix are known to improve the sta-bility over time of the G...
The model-free exponential smoothing (ES) approach is a simple and robust way to make forecasts of r...