We analyze two robust portfolio selection models, where a mean-variance investor considers possible deviations from a reference distribution of asset returns, adopting a maxmin criterion. The two models differ in the metric used to measure the distance between the reference distribution of asset returns and the alternative probability distributions. In the first model, where relative entropy is used as a measure of distance between distributions, an observational equivalence result obtains, whereby introducing robustness is equivalent to increasing risk aversion and, therefore, the percentage composition of the optimal portfolio of risky assets is equal to that of the optimal portfolio held by an investor without concerns for robustness. In...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Many optimization problems involve parameters which are not known in advance, but can only be foreca...
In this paper we develop tight bounds on the expected values of several risk measures that are of in...
Accounting for the non-normality of asset returns remains challenging in robust portfolio optimizati...
Accounting for the non-normality of asset returns remains challenging in robust portfolio optimizati...
We propose a continuous maximum entropy method to investigate the robustoptimal portfolio selection ...
In this paper, a new methodology for computing relative-robust portfolios based on minimax regret is...
Considering mean-variance portfolio problems with uncertain model parameters, we contrast the classi...
Portfolio selection in the financial literature has essentially been analyzed under two central assu...
In behavioral finance, aversion affects investors' judgment of future uncertainty when profit and lo...
In this thesis, we investigate the properties of entropy as an alternative measure of risk. Entropy ...
This paper investigates model risk issues in the context of mean-variance portfolio selection. We an...
Interest in distributionally robust optimization has been increasing recently. In this dissertation,...
Two important problems arising in traditional asset allocation methods are the sensitivity to estima...
We consider the problem of optimal portfolio choice using the lower partial moments risk measure for...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Many optimization problems involve parameters which are not known in advance, but can only be foreca...
In this paper we develop tight bounds on the expected values of several risk measures that are of in...
Accounting for the non-normality of asset returns remains challenging in robust portfolio optimizati...
Accounting for the non-normality of asset returns remains challenging in robust portfolio optimizati...
We propose a continuous maximum entropy method to investigate the robustoptimal portfolio selection ...
In this paper, a new methodology for computing relative-robust portfolios based on minimax regret is...
Considering mean-variance portfolio problems with uncertain model parameters, we contrast the classi...
Portfolio selection in the financial literature has essentially been analyzed under two central assu...
In behavioral finance, aversion affects investors' judgment of future uncertainty when profit and lo...
In this thesis, we investigate the properties of entropy as an alternative measure of risk. Entropy ...
This paper investigates model risk issues in the context of mean-variance portfolio selection. We an...
Interest in distributionally robust optimization has been increasing recently. In this dissertation,...
Two important problems arising in traditional asset allocation methods are the sensitivity to estima...
We consider the problem of optimal portfolio choice using the lower partial moments risk measure for...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Many optimization problems involve parameters which are not known in advance, but can only be foreca...
In this paper we develop tight bounds on the expected values of several risk measures that are of in...