In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and Limited Expected Loss constraints in a continuous time framework, where stocks follow a geometric Brownian motion. Analytic expressions for Value at Risk, Average Value at Risk and Limited Expected Loss are derived. We solve the problem of minimizing risk measures applied to portfolios. Moreover, the portfolio’s expected return is maximized subject to the aforementioned risk measures. We illustrate the effect of these risk measures on portfolio optimization by using numerical experiments
It is widely recognized that when classical optimal strategies are applied with parameters estimated...
Nowadays, Quadratic Programming (QP) models, like Markowitz model, are not hard to solve, thanks to ...
In this paper, we develop a portfolio selection model which allocates financial assets by maximising...
In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and L...
In this paper we analyse the effects arising from imposing a Value-at-Risk constraint in an agent's ...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
We discuss a class of risk measures for portfolio optimization with linear loss functions, where the...
Several approaches exist to model decision making under risk, where risk can be broadly defined as t...
International audienceThis paper deals with portfolio optimization under different risk constraints....
We consider a continuous-time portfolio problem with a capital at risk (CaR) constraint for constant...
This paper deals with risk measurement and portfolio optimization under risk constraints. Firstly we...
ABSTRACT Several approaches exist to model decision making under risk, where risk can be broadly def...
An important aspect in portfolio optimization is the quantification of risk. Variance was the starti...
In this research, we search for optimal portfolio strategies in the presence of various risk measure...
This thesis aims to study the risk measure Conditional Value-at-Risk and analyse an optimization pro...
It is widely recognized that when classical optimal strategies are applied with parameters estimated...
Nowadays, Quadratic Programming (QP) models, like Markowitz model, are not hard to solve, thanks to ...
In this paper, we develop a portfolio selection model which allocates financial assets by maximising...
In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and L...
In this paper we analyse the effects arising from imposing a Value-at-Risk constraint in an agent's ...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
We discuss a class of risk measures for portfolio optimization with linear loss functions, where the...
Several approaches exist to model decision making under risk, where risk can be broadly defined as t...
International audienceThis paper deals with portfolio optimization under different risk constraints....
We consider a continuous-time portfolio problem with a capital at risk (CaR) constraint for constant...
This paper deals with risk measurement and portfolio optimization under risk constraints. Firstly we...
ABSTRACT Several approaches exist to model decision making under risk, where risk can be broadly def...
An important aspect in portfolio optimization is the quantification of risk. Variance was the starti...
In this research, we search for optimal portfolio strategies in the presence of various risk measure...
This thesis aims to study the risk measure Conditional Value-at-Risk and analyse an optimization pro...
It is widely recognized that when classical optimal strategies are applied with parameters estimated...
Nowadays, Quadratic Programming (QP) models, like Markowitz model, are not hard to solve, thanks to ...
In this paper, we develop a portfolio selection model which allocates financial assets by maximising...