Thapar, Rishi and Minsky, Bernard and Obradovic, M and Tang, Qi (2009): Applying a global optimisation algorithm to Fund of Hedge Funds portfolio optimisation.
Preview |
PDF
MPRA_paper_17099.pdf Download (258kB) | Preview |
Abstract
Portfolio optimisation for a Fund of Hedge Funds (“FoHF”) has to address the asymmetric, non-Gaussian nature of the underlying returns distributions. Furthermore, the objective functions and constraints are not necessarily convex or even smooth. Therefore traditional portfolio optimisation methods such as mean-variance optimisation are not appropriate for such problems and global search optimisation algorithms could serve better to address such problems. Also, in implementing such an approach the goal is to incorporate information as to the future expected outcomes to determine the optimised portfolio rather than optimise a portfolio on historic performance. In this paper, we consider the suitability of global search optimisation algorithms applied to FoHF portfolios, and using one of these algorithms to construct an optimal portfolio of investable hedge fund indices given forecast views of the future and our confidence in such views.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Applying a global optimisation algorithm to Fund of Hedge Funds portfolio optimisation |
| Language: | English |
| Keywords: | portfolio optimisation; optimization; fund of hedge funds; global search optimisation; direct search; pgsl; hedge fund portfolio |
| Subjects: | G - Financial Economics > G1 - General Financial Markets > G11 - Portfolio Choice ; Investment Decisions C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling > C63 - Computational Techniques ; Simulation Modeling C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General > C15 - Statistical Simulation Methods: General C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling > C61 - Optimization Techniques ; Programming Models ; Dynamic Analysis |
| Item ID: | 17099 |
| Depositing User: | rishi thapar |
| Date Deposited: | 05 Sep 2009 07:27 |
| Last Modified: | 29 Sep 2019 02:08 |
| References: | [1] http://www.mat.univie.ac.at/~neum/ms/StArt.pdf [BT] F Black and R Litterman, Asset Allocation: Combining Investor Views With Market Equilibrium, Goldman, Sachs & Co., Fixed Income Research, September 1990 [CKM] S Ciliberti, I Kondor and M Mezard, On the Feasibility of Portfolio Optimisation under Expected Shortfall, Quantitative Finance, 7(4), 2007, 389–396. [CMLT] A Chabaane, J P Laurent, Y Malevergne and F Turpin, Alternative Risk Measures for Alternative Investments, 21e Conference International en Finance, 2004. [CUZ] A Chekhlov, S Uryasev and M Zabarankin, Drawdown Measure in Portfolio Optimisation, International Journal of Theoretical and Applied Finance Vol. 8, No. 1 (2005) 13 58 [EG] Paul Embrechts, Giovanni Puccetti, Aggregating Risk Capital, with an Application to Operational Risk, The GENEVA Risk and Insurance, Vol 31, Issue 2 [ET] I Ekeland and Roger Temam, Convex Analysis and Variational Problem, Society for Industrial and Applied Mathematics, 1999. [FREEDMAN] D A Freedman, Bootstrapping Regression Models, Ann Statist. 9, 1981, 1218 1228 [FS] G Fisher and A B Sim, Some Finite Sample Theory for Bootstrap Regression Estimates, Journal of Statistical Planning and Inference 43, 1995, 289–300 [FV] C I Fabian and A Veszpremi, Algorithms for CVaR Optimisation in Dynamic Stochastic Programming Models with Applications to Finance, Rutcor Research Report, RRR 24–2006, 09/2006 [GKH] M Gilli, E Kellezi and H Hysi, A Data-Driven Optimisation Heuristic for Downside Risk Minimisation, Journal of Risk, 8(3), 2006, 1 19. [HN] W Huyer and A Neumaier, Global Optimisation by Multilevel Coordinate Search, J. Global Optimisation 14, 1999, 331 355. [HUYER] W Huyer, A Comparison of Some Algorithms for Bound Constrained Global Optimisation, working paper, 2004. [HWRSVJBT] J. He, L. T. Watson, N. Ramakrishnan, C. A. Shaffer, A. Verstack, J Jiang, K. Bae and W. H. Tranter, Dynamic Data Structures for a Direct Search Algorithm, Computational Optimisation and Applications, 23, 2002, 5–25 [KB] S.J. Kane and M.C. Bartholomew-Biggs, Optimising Omega, Journal of Global Optimisation, Vol 45, Number 1. [KK] A I Kibzun and E A Kuznetsov, Comparison of VaR and CVaR Criteria, Automation and Remote Control, 64(7), 2003, 1154 1164 [KK1] P D Kaplan and J A Knowles, Kappa: A Generalised Downside Risk-Adjusted Performance Measure, Journal of Performance Measurement, Spring 2004. [KPU] P Krokhmal and S Uryasev, Portfolio Optimisation with Conditional Value-at-Risk Objective and Constraints, The Journal of Risk, 4(2), Winter 2001/02. [KS] C Keating and W F Shadwick, A Universal Performance Measure, http://www.spgshop.com/index.asp?PageAction=VIEWPROD&ProdID=413. [KSG] H Kazemi, T Schneeweis and R Gupta, Omega as a performance measure, http://www.edhec risk.com/site_edhecrisk/public/research_news/choice/RISKReview1063631261806712604, 2003. [M1] Genetic Algorithm and Direct Search Toolbox™ 2 User’s Guide, Mathworks, http://www.mathworks.com/access/helpdesk/help/pdf_doc/gads/gads_tb.pdf [MOTT] B Minsky, M Obradovic, Q Tang and R Thapar, Global Optimisation algorithms for financial portfolio optimisation, Working Paper University of Sussex, 2008 [MP] D Martinger and P Parpas, Global Optimisation of Higher Order Moments in Portfolio Selection, J Glob Optim, 2007. [MSRY] L Mitra, X Sun, D Roman, G Mitra & K Yu, Mixture distribution scenarios for investment decisions with downside risk, Working Paper, SSRN, June 2009 [N1] NAG Library Routine Document E05JBF, NAG, http://www.nag.co.uk/numeric/FL/nagdoc_fl22/pdf/E05/e05jbf.pdf [PFLUG] G Ch Pflug, Some Remarks on the Value-at-Risk and the Conditional Value-at-Risk, in Probabilistic Constrained Optimisation, Methodology and Applications, ed. S Uryasev, Kluwer, 2000. [RABER] U Raber, A Simplicial Branch-and-Bound Method for Solving Nonconvex All-Quadratic Programs, Journal of Global Optimisation, 13, 1998, 417-432. [RS] B Raphael and I F C Smith, A Direct Stochastic Algorithm for Global Search, Applied Mathematics and Computation, 146, 2003, 729-758 [RU] R T Rockafellar and S Uryasev, Optimisation of Conditional Value-at-Risk, Journal of Risk, 2(3), 2000, 21-41. [RUZ] R T Rockafellar, S Uryasev and M Zabarankin, Deviation Measure in Risk Analysis and Optimisation (December 22, 2002). University of Florida, Department of Industrial & Systems Engineering Working Paper No. 2002-7. Available at SSRN: http://ssrn.com/abstract=365640. [RUZ1] R T Rockafellar, S Uryasev and M Zabarankin, Optimality Conditions in Portfolio Analysis with General Deviation Measures (May 10, 2005). University of Florida Industrial and Systems Engineering Working Paper No. 2004–7. Available at SSRN: http://ssrn.com/abstract=615581 [T1] User’s guide for TOMLAB/ LGO1TOMLAB http://tomopt.com/docs/TOMLAB_LGO.pdf [WM] P Winker and D Maringer, The Threshold Accepting Optimisation Algorithms in Economics and Statistics, in: Kontoghiorges, E.J., Gatu, Chr. (eds.), Optimisation, Econometric and Financial Analysis, Springer, 2007. [YYSL] X Yang, Z Yang, Z Shen and G Lu, Gray-Encoded Hybrid Accelerating Genetic Algorithm for Global Optimisation of Water Environmental Model, Springer, 2006. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/17099 |
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
