In this paper, we propose a new portfolio selection model with the maximum utility based on the interval-valued possibilistic mean and possibilistic variance, which is a two-parameter quadratic programming problem. We also present a sequential minimal optimization (SMO) algorithm to obtain the optimal portfolio. The remarkable feature of the algorithm is that it is extremely easy to implement, and it can be extended to any size of portfolio selection problems for finding an exact optimal solution.Possibilistic distribution Portfolio selection Mean-variance utility Parametric quadratic programming Sequential minimal optimization (SMO)
In this paper, we offer a novel class of utility functions applied to optimal portfolio selection. T...
The portfolio selection problem is usually considered as a bicriteria optimization problem where a r...
In Financial Mathematics, classical Markowitz Portfolio theory provides a strategy for optimizing re...
Compared with the conventional probabilistic mean-variance methodology, fuzzy number can better desc...
Based on the Markowitz mean variance model, this paper discusses the portfolio selection problem in ...
Based on the Markowitz mean variance model, this paper discusses the portfolio selection problem in ...
Abstract. The Markowitz model for single period portfolio optimization quantifies the problem by mea...
AbstractIn this paper, we introduce the possibilistic mean value and variance of continuous distribu...
This paper studies the mean-variance (MV) portfolio problems under static and dynamic settings, part...
In this paper, we introduce a new portfolio selection method. Our method is innovative and flexible....
We propose some portfolio selection models based on Cumulative Prospect Theory. In particular, we co...
(Journal cited in: MathSciNet, n. MR1940218)In standard mean-variance portfolio selection, several s...
The classical Quadratic Programming formulation of the well known portfolio selection problem, is cu...
AbstractIn this paper, we mainly discuss an optimal portfolio selection model with liability managem...
This paper analyses the portfolio selection problem under the non-expected tility theory. We assume ...
In this paper, we offer a novel class of utility functions applied to optimal portfolio selection. T...
The portfolio selection problem is usually considered as a bicriteria optimization problem where a r...
In Financial Mathematics, classical Markowitz Portfolio theory provides a strategy for optimizing re...
Compared with the conventional probabilistic mean-variance methodology, fuzzy number can better desc...
Based on the Markowitz mean variance model, this paper discusses the portfolio selection problem in ...
Based on the Markowitz mean variance model, this paper discusses the portfolio selection problem in ...
Abstract. The Markowitz model for single period portfolio optimization quantifies the problem by mea...
AbstractIn this paper, we introduce the possibilistic mean value and variance of continuous distribu...
This paper studies the mean-variance (MV) portfolio problems under static and dynamic settings, part...
In this paper, we introduce a new portfolio selection method. Our method is innovative and flexible....
We propose some portfolio selection models based on Cumulative Prospect Theory. In particular, we co...
(Journal cited in: MathSciNet, n. MR1940218)In standard mean-variance portfolio selection, several s...
The classical Quadratic Programming formulation of the well known portfolio selection problem, is cu...
AbstractIn this paper, we mainly discuss an optimal portfolio selection model with liability managem...
This paper analyses the portfolio selection problem under the non-expected tility theory. We assume ...
In this paper, we offer a novel class of utility functions applied to optimal portfolio selection. T...
The portfolio selection problem is usually considered as a bicriteria optimization problem where a r...
In Financial Mathematics, classical Markowitz Portfolio theory provides a strategy for optimizing re...