Bodnar and Schmid (2008) derived the distribution of the global minimum variance portfolio weights and obtained the distribution of the test statistics for the general linear hypothesis. Their results are obtained in the case when the number of observations n is bigger or equal than the size of portfolio k. In the present paper, we extend the result by analyzing the portfolio weights in a small sample case of n < k, with the singular covariance matrix. The results are illustrated using actual stock returns. A discussion of practical relevance of the model is presented
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
In this paper we consider the estimation of the weights of optimal portfolios from the Bayesian poin...
In this paper, we provide a general framework for identifying portfolios that perform well out-of-sa...
Recently, a test dealing with the linear hypothesis for the global minimum variance portfolio weight...
Traditional portfolio optimization has often been criticized for not taking estimation risk into acc...
In this paper, we construct two tests for the weights of the global minimum variance portfolio (GMVP...
In this paper we derive the finite-sample distribution of the estimated weights of the tangency port...
In this thesis the effects of utilizing the sample covariance matrix in the estimation of the global...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
We estimate the global minimum variance (GMV) portfolio in the high-dimensional case using results f...
The main purpose of this thesis is to give a basic understanding of the GMV portfolio theory and the...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
The global minimum variance portfolio computed using the sample covariance matrix is known to be neg...
This research uses four different methods of variance-covariance estimation namely Traditional, Trad...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
In this paper we consider the estimation of the weights of optimal portfolios from the Bayesian poin...
In this paper, we provide a general framework for identifying portfolios that perform well out-of-sa...
Recently, a test dealing with the linear hypothesis for the global minimum variance portfolio weight...
Traditional portfolio optimization has often been criticized for not taking estimation risk into acc...
In this paper, we construct two tests for the weights of the global minimum variance portfolio (GMVP...
In this paper we derive the finite-sample distribution of the estimated weights of the tangency port...
In this thesis the effects of utilizing the sample covariance matrix in the estimation of the global...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
We estimate the global minimum variance (GMV) portfolio in the high-dimensional case using results f...
The main purpose of this thesis is to give a basic understanding of the GMV portfolio theory and the...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
The global minimum variance portfolio computed using the sample covariance matrix is known to be neg...
This research uses four different methods of variance-covariance estimation namely Traditional, Trad...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
In this paper we consider the estimation of the weights of optimal portfolios from the Bayesian poin...
In this paper, we provide a general framework for identifying portfolios that perform well out-of-sa...