Top

Published in:

2015 | OriginalPaper | Chapter

94. A Generalized Model for Optimum Futures Hedge Ratio

Authors : Cheng-Few Lee, Jang-Yi Lee, Kehluh Wang, Yuan-Chung Sheu

Published in: Handbook of Financial Econometrics and Statistics

Publisher: Springer New York

Activate our intelligent search to find suitable subject content or patents.

search-config

AI-assisted search

Off

Abstract

Under martingale and joint-normality assumptions, various optimal hedge ratios are identical to the minimum variance hedge ratio. As empirical studies usually reject the joint-normality assumption, we propose the generalized hyperbolic distribution as the joint log-return distribution of the spot and futures. Using the parameters in this distribution, we derive several most widely used optimal hedge ratios: minimum variance, maximum Sharpe measure, and minimum generalized semivariance. Under mild assumptions on the parameters, we find that these hedge ratios are identical. Regarding the equivalence of these optimal hedge ratios, our analysis suggests that the martingale property plays a much important role than the joint distribution assumption.

To estimate these optimal hedge ratios, we first write down the log-likelihood functions for symmetric hyperbolic distributions. Then we estimate these parameters by maximizing the log-likelihood functions. Using these MLE parameters for the generalized hyperbolic distributions, we obtain the minimum variance hedge ratio and the optimal Sharpe hedge ratio. Also based on the MLE parameters and the numerical method, we can calculate the minimum generalized semivariance hedge ratio.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Wirtschaft"

Online-Abonnement

Mit Springer Professional "Wirtschaft" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 340 Zeitschriften

aus folgenden Fachgebieten:

Bauwesen + Immobilien
Business IT + Informatik
Finance + Banking
Management + Führung
Marketing + Vertrieb
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

previous chapter A Dynamic CAPM with Supply Effect Theory and Empirical Results

next chapter Instrumental Variables Approach to Correct for Endogeneity in Finance

Adams, J., & Montesi, C. J. (1995). Major issues related to hedge accounting. Newark: Financial Accounting Standard Board.

Atkinson, A. C. (1982). The simulation of generalized inverse Gaussian and hyperbolic random variables. SIAM Journal of Scientific and Statistical Computing, 3, 502–515.CrossRef

Barndorff-Nielsen, O. E. (1977). Exponentially decreasing distributions for the logarithm of particle size. Proceedings of the Royal Society London A, 353, 401–419.CrossRef

Barndorff-Nielsen, O. E. (1978). Hyperbolic distributions and distributions on hyperbolae. Scandinavian Journal of Statistics, 5, 151–157.

Barndorff-Nielsen, O. E. (1995). Normal inverse Gaussian distributions and the modeling of stock returns. Research Report no. 300, Department of Theoretical Statistics, Aarhus University.

Bawa, V. S. (1975). Optimal rules for ordering uncertain prospects. Journal of Financial Economics, 2, 95–121.CrossRef

Bawa, V. S. (1978). Safety-first, stochastic dominance, and optimal portfolio choice. Journal of Financial and Quantitative Analysis, 13, 255–271.CrossRef

Bibby, B. M., & Sørensen, M. (2003). Hyperbolic processes in finance. In S. T. Rachev (Ed.), Handbook of heavy tailed distributions in finance (pp. 211–248). Amsterdam/The Netherlands: Elsevier Science.

Bingham, N. H., & Kiesel, R. (2001). Modelling asset returns with hyperbolic distribution. In J. Knight & S. Satchell (Eds.), Return distribution in Finance (pp. 1–20). Oxford/Great Britain: Butterworth-Heinemann.

Blæsid, P. (1981). The two-dimensional hyperbolic distribution and related distribution with an application to Johannsen’s bean data. Biometrika, 68, 251–263.CrossRef

Chen, S. S., Lee, C. F., & Shrestha, K. (2001). On a mean-generalized semivariance approach to determining the hedge ratio. Journal of Futures Markets, 21, 581–598.CrossRef

Chen, S. S., Lee, C. F., & Shrestha, K. (2003). Futures hedge ratio: A review. The Quarterly Review of Economics and Finance, 43, 433–465.CrossRef

De Jong, A., De Roon, F., & Veld, C. (1997). Out-of-sample hedging effectiveness of currency futures for alternative models and hedging strategies. Journal of Futures Markets, 17, 817–837.CrossRef

Eberlein, E., & Keller, U. (1995). Hyperbolic distributions in finance. Bernoulli, 1, 281–299.CrossRef

Eberlein, E., Keller, U., & Prause, K. (1998). New insights into smile, mispricing and value at risk: The hyperbolic model. Journal of Business, 71, 371–406.CrossRef

Fishburn, P. C. (1977). Mean-risk analysis with risk associated with below-target returns. American Economic Review, 67, 116–126.

Harlow, W. V. (1991). Asset allocation in a downside-risk framework. Financial Analysts Journal, 47, 28–40.CrossRef

Howard, C. T., & D’Antonio, L. J. (1984). A risk-return measure of hedging effectiveness. Journal of Financial and Quantitative Analysis, 19, 101–112.CrossRef

Johnson, L. L. (1960). The theory of hedging and speculation in commodity futures. Review of Economic Studies, 27, 139–151.CrossRef

Kücher, U., Neumann, K., Sørensen, M., & Streller, A. (1999). Stock returns and hyperbolic distributions. Mathematical and Computer Modelling, 29, 1–15.CrossRef

Lien, D., & Tse, Y. K. (1998). Hedging time-varying downside risk. Journal of Futures Markets, 18, 705–722.CrossRef

Lien, D., & Tse, Y. K. (2000). Hedging downside risk with futures contracts. Applied Financial Economics, 10, 163–170.CrossRef

Lien, D., & Tse, Y. K. (2001). Hedging downside risk: Futures vs. options. International Review of Economics and Finance, 10, 159–169.CrossRef

Price, K., Price, B., & Nantel, T. J. (1982). Variance and lower partial moment measures of systematic risk: Some analytical and empirical results. Journal of Finance, 37, 843–855.CrossRef

Rydberg, T. H. (1997). The normal inverse Gaussian Levy process: Simulation and approximation. Communications in Statistics: Stochastic models, 13, 887–910.

Rydberg, T. H. (1999). Generalized hyperbolic diffusion processes with applications in finance. Mathematical Finance, 9, 183–201.CrossRef

Scott, W. (1979). On optimal and data-based histograms. Biometrika, 33, 605–610.CrossRef

Title: A Generalized Model for Optimum Futures Hedge Ratio
Authors: Cheng-Few Lee
Jang-Yi Lee
Kehluh Wang
Yuan-Chung Sheu
Publisher: Springer New York
Book: Handbook of Financial Econometrics and Statistics
Print ISBN: 978-1-4614-7749-5

Electronic ISBN: 978-1-4614-7750-1

Copyright Year: 2015
DOI: https://doi.org/10.1007/978-1-4614-7750-1_94