A robust minimax approach for optimal investment decisions with imprecise return forecasts and risk estimations in financial portfolio management is considered. Single-period and multi-period mean-variance optimization models are extended to worst-case design with multiple rival risk estimations and return forecasts. In multi-period stochastic formulation of classical mean-variance portfolio optimization problem, an investor makes an investment decision based on expectations and/or scenarios up to some intermediate times prior to the horizon and, consequently, rebalances or restructures the portfolio. Multi-period portfolio optimization entails the construction of a scenario tree representing a discretized estimate of uncertainties and asso...
This project covers the basics of Financial Portfolio Management theory through different stochastic...
We propose a novel multi-period trading model that allows portfolio managers to perform optimal port...
We propose an approach to portfolio management over a finite time horizon that (i) does not require ...
In this paper, we extend the multi-period mean-variance optimization framework to worst-case design ...
This paper presents new models which seek to optimize the first and second moments of asset returns ...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon return ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
University of Technology Sydney. Faculty of Science.This thesis contributes towards the development ...
We consider robust pre-commitment and time-consistent mean-variance optimal asset allocation strate...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon wealth ...
In this chapter, we are concerned with decision making methods for dynamic systems under uncertainty...
Traditional techniques in portfolio management rely on the precise knowledge of the underlying proba...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Summarization: An efficient frontier in the typical portfolio selection problem provides an illustra...
In the 1950s, Markowitz proposed to combine dif-ferent investment instruments to design a portfolio ...
This project covers the basics of Financial Portfolio Management theory through different stochastic...
We propose a novel multi-period trading model that allows portfolio managers to perform optimal port...
We propose an approach to portfolio management over a finite time horizon that (i) does not require ...
In this paper, we extend the multi-period mean-variance optimization framework to worst-case design ...
This paper presents new models which seek to optimize the first and second moments of asset returns ...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon return ...
A robust optimization has emerged as a powerful tool for managing un- certainty in many optimization...
University of Technology Sydney. Faculty of Science.This thesis contributes towards the development ...
We consider robust pre-commitment and time-consistent mean-variance optimal asset allocation strate...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon wealth ...
In this chapter, we are concerned with decision making methods for dynamic systems under uncertainty...
Traditional techniques in portfolio management rely on the precise knowledge of the underlying proba...
The mean-variance approach was first proposed by Markowitz (1952), and laid the foundation of the mo...
Summarization: An efficient frontier in the typical portfolio selection problem provides an illustra...
In the 1950s, Markowitz proposed to combine dif-ferent investment instruments to design a portfolio ...
This project covers the basics of Financial Portfolio Management theory through different stochastic...
We propose a novel multi-period trading model that allows portfolio managers to perform optimal port...
We propose an approach to portfolio management over a finite time horizon that (i) does not require ...