International audienceThe DownSide Risk (DSR) model for portfolio optimization allows to overcome the drawbacks of the classical Mean-Variance model concerning the asymmetry of returns and the risk perception of investors. This optimization model deals with a positive definite matrix that is endogenous with respect to the portfolio weights and hence yields to a non standard optimization problem. To bypass this hurdle, Athayde (2001) developed a new recursive minimization procedure that ensures the convergence to the solution. However, when a finite number of observations is available, the portfolio frontier usually exhibits some inflexion points which make this curve not very smooth. In order to overcome these points, Athayde (2003) propose...
This paper aims to analyze the efficacy of variance and measures of downside risk for of formation o...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Portfolio optimization is a very classical and challenging problem that is interested in many areas ...
The DownSide Risk (DSR) model for portfolio optimisation allows to overcome the drawbacks of the cla...
The DownSide Risk (DSR) model for portfolio optimization allows to overcome the drawbacks of the cl...
La méthode d'optimisation d'un portefeuille issue de la minimisation du DownSide Risk a été mise au ...
To create efficient funds appealing to a sector of bank clients, the objective of minimizing downsid...
The well-known mean-variance model and the downside risk model are used to investment decision probl...
An ongoing stream in financial analysis proposes mean-semivariance in place of mean-variance as an a...
The mathematical model of portfolio optimization is usually represented as a bicriteria optimization...
While univariate nonparametric estimation methods have been developed for estimating returns in mean...
The tradeoff between risk and return is a topic that most investors consider carefully before an inv...
We propose a nonparametric kernel estimation method (KEM) that deter-mines the optimal hedge ratio b...
We propose a new estimator for Expected Shortfall that uses asymptotic expansions to account for the...
Portfolio investment is a passive investment since the investor is not actively involved in the mana...
This paper aims to analyze the efficacy of variance and measures of downside risk for of formation o...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Portfolio optimization is a very classical and challenging problem that is interested in many areas ...
The DownSide Risk (DSR) model for portfolio optimisation allows to overcome the drawbacks of the cla...
The DownSide Risk (DSR) model for portfolio optimization allows to overcome the drawbacks of the cl...
La méthode d'optimisation d'un portefeuille issue de la minimisation du DownSide Risk a été mise au ...
To create efficient funds appealing to a sector of bank clients, the objective of minimizing downsid...
The well-known mean-variance model and the downside risk model are used to investment decision probl...
An ongoing stream in financial analysis proposes mean-semivariance in place of mean-variance as an a...
The mathematical model of portfolio optimization is usually represented as a bicriteria optimization...
While univariate nonparametric estimation methods have been developed for estimating returns in mean...
The tradeoff between risk and return is a topic that most investors consider carefully before an inv...
We propose a nonparametric kernel estimation method (KEM) that deter-mines the optimal hedge ratio b...
We propose a new estimator for Expected Shortfall that uses asymptotic expansions to account for the...
Portfolio investment is a passive investment since the investor is not actively involved in the mana...
This paper aims to analyze the efficacy of variance and measures of downside risk for of formation o...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Portfolio optimization is a very classical and challenging problem that is interested in many areas ...