Abstract: Problem statement: The most important character within optimization problem is the uncertainty of the future returns. Approach: To handle such problems, we utilized probabilistic methods alongside with optimization techniques. We developed single stage and two stage stochastic programming with recourse. The models were developed for risk adverse investors and the objective of the stochastic programming models is to minimize the maximum downside semi deviation. We used the so-called “Here-and-Now ” approach where the decision-maker makes decision “now ” before observing the actual outcome for the stochastic parameter. Results: We compared the optimal portfolios between the single stage and two stage models with the incorporation of...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon return ...
The topic of this thesis is portfolio optimization under model ambiguity, i.e. a situation when the ...
The public defense on 8th May 2020 at 12:15 will be organized via remote technology. Link: https://...
Portfolio optimization is an important research field in financial decision making. The chief charac...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
In mean-risk portfolio optimization, it is typically assumed that the assets follow a known distribu...
This project covers the basics of Financial Portfolio Management theory through different stochastic...
An ongoing stream in financial analysis proposes mean-semivariance in place of mean-variance as an a...
Stock investment is an investment in securities with the hope of getting profits in the future. Inve...
Published ArticleA multi-stage stochastic optimal portfolio policy that minimizes downside risk in t...
In this diploma paper we discuss selected optimization methods and mathematical programming models. ...
Portfolio management problems can be broadly divided into two classes of differing investing styles:...
Stochastic optimization is an effective tool for analyzing decision problems under uncertainty. In s...
This thesis presentation presents a stochastic approach to portfolio construction using various risk...
Portfolio selection focuses on allocating the capital to a set of securities such that the profit or...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon return ...
The topic of this thesis is portfolio optimization under model ambiguity, i.e. a situation when the ...
The public defense on 8th May 2020 at 12:15 will be organized via remote technology. Link: https://...
Portfolio optimization is an important research field in financial decision making. The chief charac...
The problem of investing money is common to citizens, families and companies. In this chapter, we in...
In mean-risk portfolio optimization, it is typically assumed that the assets follow a known distribu...
This project covers the basics of Financial Portfolio Management theory through different stochastic...
An ongoing stream in financial analysis proposes mean-semivariance in place of mean-variance as an a...
Stock investment is an investment in securities with the hope of getting profits in the future. Inve...
Published ArticleA multi-stage stochastic optimal portfolio policy that minimizes downside risk in t...
In this diploma paper we discuss selected optimization methods and mathematical programming models. ...
Portfolio management problems can be broadly divided into two classes of differing investing styles:...
Stochastic optimization is an effective tool for analyzing decision problems under uncertainty. In s...
This thesis presentation presents a stochastic approach to portfolio construction using various risk...
Portfolio selection focuses on allocating the capital to a set of securities such that the profit or...
We develop and test multistage portfolio selection models maximizing expected end-of-horizon return ...
The topic of this thesis is portfolio optimization under model ambiguity, i.e. a situation when the ...
The public defense on 8th May 2020 at 12:15 will be organized via remote technology. Link: https://...