McCauley, Joseph L. and Gunaratne, Gemunu H. (2003): An empirical model of volatility of returns and option pricing. Published in: Physica A , Vol. 329, (2003): pp. 178-198.
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Abstract
This paper reports several entirely new results on financial market dynamics and option pricing We observe that empirical distributions of returns are much better approximated by an exponential distribution than by a Gaussian. This exponential distribution of asset prices can be used to develop a new pricing model for options (in closed algebraic form) that is shown to provide valuations that agree very well with those used by traders. We show how the Fokker-Planck formulation of fluctuations can be used with a local volatility (diffusion coeffficient) to generate an exponential distribution for asset returns, and also how fat tails for extreme returns are generated dynamically by a simple generalization of our new volatility model. Nonuniqueness in deducing dynamics from empirical data is discussed and is shown to have no practical effect over time scales much less than one hundred years. We derive an option pricing pde and explain why it‘s superfluous, because all information required to price options in agreement with the delta-hedge is already included in the Green function of the Fokker-Planck equation for a special choice of parameters. Finally, we also show how to calculate put and call prices for a stretched exponential returns density.
| Item Type: | MPRA Paper |
|---|---|
| Institution: | University of Houston |
| Original Title: | An empirical model of volatility of returns and option pricing |
| Language: | English |
| Keywords: | Market instability; market dynamics; finance; option pricing |
| Subjects: | C - Mathematical and Quantitative Methods > C2 - Single Equation Models ; Single Variables G - Financial Economics > G0 - General C - Mathematical and Quantitative Methods > C1 - Econometric and Statistical Methods and Methodology: General |
| Item ID: | 2161 |
| Depositing User: | Joseph L. McCauley |
| Date Deposited: | 09 Mar 2007 |
| Last Modified: | 27 Sep 2019 19:59 |
| References: | 1. C. Renner, J. Peinke, R. Friedrich. Physica A 298 (2001) 49. 2. L.-H. Tang, Workshop on Econophysics and Finance (Heifei, China, 2000). z K = (!(x K " #)) $ 3. J.-P. Bouchaud, M. Potters, Theory of Financial Risks, Cambridge, Cambridge, 2000. 4. E. Aurell, S.I. Simdyankin, Int. J. Theor. And Appl. Finance 1 (1998) 1. 5. M.F.M. Osborne, in P. Cootner, P. (Ed.), The Random Character of Stock Market Prices, Cambridge, MIT, 1964. 6. M. Dacorogna, et al, An Intro. To High Frequency Finance, Academic Pr., N.Y., 2001. 7. L. Arnold, Stochastic Differential Equations, Krieger, Malabar, Fla., 1992. 8. N. Wax, N. (ed.) Selected Papers on Noise and Stochastic Processes, Dover, N.Y., 1954. 9. J. Feder, Fractals, Plenum, N.Y., 1988. 10. R. Mantegna, H.E. Stanley, H.E. An Intro. To Econophysics, Cambridge, Cambridge, 2000. 11. E.F. Fama, J. Finance 383 (May, 1970). 12. F. Black, M. Scholes, J. Political Economy 81 (1973) 637. 13. M. Baxter, A. Rennie, Financial Calculus, Cambridge, Cambridge, 1996. 14. J. Hull, Options, Futures, and Other Derivatives, Prentice-Hall, Saddle river, N.J., 1997. 15. C.M. Bender, S.A. Orszag, Advanced Math. Methods for Scientists and Engineers, McGraw-Hill, N.Y., 1978. 16. J.L. McCauley, Dynamics of Markets: economics and finance from a physicist’s standpoint, Cambridge, Cambridge, forthcoming in 2003. 17. E.S.C. Ching, Phys. Rev. E53 (1996) 5899; G. Stolovitsky, G. E.S.C. Ching, Phys. Lett. A255 (1999) 11. 18. R. Friedrich, J. Peinke, Physica D46 (1990) 177; C. Rener, J. Peinke, R. Friedrich, J. Fl. Mech. 433 (2000) 383. 19. G.H. Gunaratne, J.L. McCauley, A Theory for Fluctuations in Stock Prices and Valuation of their Options, submitted 2002. 20. A. Chhabra, R.V. Jensen, K.R. Sreenivasan, Phys. Rev. A40 (1988) 4593. 21. R. Friedrichs, S. Siegert, J. Peinke, St. Lück, S. Siefert, M. Lindemann, J. Raethjen, G. Deuschl, G. Pfister, Phys. Lett. A271 (2000) 217. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/2161 |
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