The problem of how to determine portfolio weights so that the variance of portfolio returns is minimized has been given considerable attention in the literature, and several methods have been proposed. Some properties of these estimators, however, remain unknown, and many of their relative strengths and weaknesses are therefore difficult to assess for users. This paper contributes to the field by comparing and contrasting the risk functions used to derive efficient portfolio weight estimators. It is argued that risk functions commonly used to derive and evaluate estimators may be inadequate and that alternative quality criteria should be considered instead. The theoretical discussions are supported by a Monte Carlo simulation and two empiri...
The literature on portfolio selection and risk measurement has considerably advanced in recent years...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
Disappointed with the performance of market weighted benchmark portfolios yet skeptical about the me...
The problem of how to determine portfolio weights so that the variance of portfolio returns is minim...
Traditional portfolio optimization has often been criticized for not taking estimation risk into acc...
The paper discusses finite sample properties of optimal portfolio weights, estimated expected portfo...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
In this paper we consider the estimation of the weights of optimal portfolios from the Bayesian poin...
Risk is one of the important parameters in portfolio optimization problem. Since the introduction of...
The minimum variance portfolio and equally-weighted portfolio have been used extensively in the fina...
We propose an adjustment in mean-variance portfolio weights to incorporate uncertainty caused by the...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
The global minimum variance portfolio computed using the sample covariance matrix is known to be neg...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
The literature on portfolio selection and risk measurement has considerably advanced in recent years...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
Disappointed with the performance of market weighted benchmark portfolios yet skeptical about the me...
The problem of how to determine portfolio weights so that the variance of portfolio returns is minim...
Traditional portfolio optimization has often been criticized for not taking estimation risk into acc...
The paper discusses finite sample properties of optimal portfolio weights, estimated expected portfo...
The global minimum variance portfolio (GMVP) is the starting point of the Markowitz mean-variance ef...
In this paper we consider the estimation of the weights of optimal portfolios from the Bayesian poin...
Risk is one of the important parameters in portfolio optimization problem. Since the introduction of...
The minimum variance portfolio and equally-weighted portfolio have been used extensively in the fina...
We propose an adjustment in mean-variance portfolio weights to incorporate uncertainty caused by the...
This paper studies the returns of efficient portfolios based on different estimations of the covaria...
The global minimum variance portfolio computed using the sample covariance matrix is known to be neg...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
We study the realized variance of sample minimum variance portfolios of arbitrarily high dimension. ...
The literature on portfolio selection and risk measurement has considerably advanced in recent years...
International audience—We study the design of portfolios under a minimum risk criterion. The perform...
Disappointed with the performance of market weighted benchmark portfolios yet skeptical about the me...