We discuss a class of risk measures for portfolio optimization with linear loss functions, where the random returns of financial instruments have a multivariate elliptical distribution. Under this setting we pay special attention to two risk measures, Value-at-Risk and Conditional-Value-at-Risk and differentiate between risk neutral and risk averse decision makers. When the so-called disutility function is taken as the identity function, the optimization problem is solved for a risk neutral investor. In this case, the optimal solutions of the two portfolio problems using the Value-at-Risk and Conditional-Value-at-Risk measures are the same as the solution of the classical Markowitz model. We adapt an existing less known finite algorithm to ...
In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and L...
Risk measures are subject to many scientific papers and monographs published on financial portfolio ...
The mathematical model of portfolio optimization is usually represented as a bicriteria optimization...
In this paper portfolio problems with linear loss functions and multivariate elliptical distributed ...
Focus is directed to a class of risk measures for portfolio optimization with two types of disutilit...
In this paper portfolio problems with linear loss functions and multivariate elliptical distributed ...
Several approaches exist to model decision making under risk, where risk can be broadly defined as t...
ABSTRACT Several approaches exist to model decision making under risk, where risk can be broadly def...
This paper is devoted to study the optimal portfolio problem. Harry Markowitz’s Ph.D. thesis prepare...
Following the seminal work by Markowitz (1952), the portfolio optimization problem is modeled as a m...
Nowadays, Quadratic Programming (QP) models, like Markowitz model, are not hard to solve, thanks to ...
This article considers classes of reward-risk optimization problems that arise from different choice...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
An important aspect in portfolio optimization is the quantification of risk. Variance was the starti...
Abstract. The Markowitz model for single period portfolio optimization quantifies the problem by mea...
In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and L...
Risk measures are subject to many scientific papers and monographs published on financial portfolio ...
The mathematical model of portfolio optimization is usually represented as a bicriteria optimization...
In this paper portfolio problems with linear loss functions and multivariate elliptical distributed ...
Focus is directed to a class of risk measures for portfolio optimization with two types of disutilit...
In this paper portfolio problems with linear loss functions and multivariate elliptical distributed ...
Several approaches exist to model decision making under risk, where risk can be broadly defined as t...
ABSTRACT Several approaches exist to model decision making under risk, where risk can be broadly def...
This paper is devoted to study the optimal portfolio problem. Harry Markowitz’s Ph.D. thesis prepare...
Following the seminal work by Markowitz (1952), the portfolio optimization problem is modeled as a m...
Nowadays, Quadratic Programming (QP) models, like Markowitz model, are not hard to solve, thanks to ...
This article considers classes of reward-risk optimization problems that arise from different choice...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
An important aspect in portfolio optimization is the quantification of risk. Variance was the starti...
Abstract. The Markowitz model for single period portfolio optimization quantifies the problem by mea...
In this paper we investigate portfolio optimization under Value at Risk, Average Value at Risk and L...
Risk measures are subject to many scientific papers and monographs published on financial portfolio ...
The mathematical model of portfolio optimization is usually represented as a bicriteria optimization...