We extend Relative Robust Portfolio Optimization models to allow portfolios to optimize their performance when considered relative to a set of benchmarks. We do this in a minimum volatility setting, where we model regret directly as the maximum difference between our volatility and that of a given benchmark. Portfolio managers are also given the option of computing regret as a proportion of the benchmark’s performance, which is more in line with market practice than other approaches suggested in the literature. Furthermore, we propose using regret as an extra constraint rather than as a brand new objective function, so practitioners can maintain their current framework. We also look into how such a triple optimization problem can be solved ...
Many financial optimization problems involve future values of security prices, interest rates and ex...
We propose a robust portfolio optimization approach based on Value-at-Risk (VaR) adjusted Sharpe rat...
This article studies three robust portfolio optimization models under partially known distributions....
We extend Relative Robust Portfolio Optimization models to allow portfolios to optimize their perfor...
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...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
This paper presents new models which seek to optimize the first and second moments of asset returns ...
Summarization: An efficient frontier in the typical portfolio selection problem provides an illustra...
Portfolio optimization models aim to optimally distribute capital among selected stocks, bonds and o...
The main purpose of this thesis is to develop methodological and practical improvements on robust po...
Robust optimization has been receiving increased attention in the recent few years due to the possib...
We develop two new approaches to robustness and learning in data-driven portfolio optimization, a pr...
Many optimization problems involve parameters which are not known in advance, but can only be foreca...
Recently a regret portfolio optimization approach is proposed by minimizing the difference between t...
Many financial optimization problems involve future values of security prices, interest rates and ex...
We propose a robust portfolio optimization approach based on Value-at-Risk (VaR) adjusted Sharpe rat...
This article studies three robust portfolio optimization models under partially known distributions....
We extend Relative Robust Portfolio Optimization models to allow portfolios to optimize their perfor...
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...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
This paper presents new models which seek to optimize the first and second moments of asset returns ...
Summarization: An efficient frontier in the typical portfolio selection problem provides an illustra...
Portfolio optimization models aim to optimally distribute capital among selected stocks, bonds and o...
The main purpose of this thesis is to develop methodological and practical improvements on robust po...
Robust optimization has been receiving increased attention in the recent few years due to the possib...
We develop two new approaches to robustness and learning in data-driven portfolio optimization, a pr...
Many optimization problems involve parameters which are not known in advance, but can only be foreca...
Recently a regret portfolio optimization approach is proposed by minimizing the difference between t...
Many financial optimization problems involve future values of security prices, interest rates and ex...
We propose a robust portfolio optimization approach based on Value-at-Risk (VaR) adjusted Sharpe rat...
This article studies three robust portfolio optimization models under partially known distributions....