Solving real-life portfolio problem using stochastic programming and Monte-Carlo techniques

被引：0

作者：

Branda, Martin ^{[1
]}

机构：

[1] Charles Univ Prague, Fac Math & Phys, Dept Probabil & Math Stat, Prague 18675 8, Czech Republic

来源：

28TH INTERNATIONAL CONFERENCE ON MATHEMATICAL METHODS IN ECONOMICS 2010, PTS I AND II | 2010年

关键词：

Value at Risk; stochastic programming; Monte-Carlo simulation; chance constraints; penalty functions; DISTRIBUTIONS; OPTIMIZATION;

D O I：

暂无

中图分类号：

F [经济];

学科分类号：

02 ;

摘要：

We deal with real-life portfolio problem with Value at Risk, transaction costs and integer allocations where the random returns are modeled using the multivariate skewed t-distribution. The original problem can be formulated as a stochastic programming problem with one chance constraint which is very hard to solve exactly. It is necessary to use sampling techniques to represent the randomness by equiprobable scenarios and to solve the approximated portfolio problem by standard mixed-integer solvers. In Branda (2010), Branda and Dupacova (2008), and Ermoliev (2000), it was shown that the chance constrained problems can be reformulated using penalty functions. However, to solve the problem with penalty objectives, it is also necessary to use sampling techniques. Finally, the ability to generate a feasible solution of the original chance constrained problem using the sample approximations of the chance constraints directly or via sample approximation of the penalty function objective is compared.

引用

页码：67 / 72

页数：6

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