论文信息 - Fractional Brownian motion, random walks and binary market models

Fractional Brownian motion, random walks and binary market models

Abstract. We prove a Donsker type approximation theorem for the fractional Brownian motion in the case $H>1/2.$ Using this approximation we construct an elementary market model that converges weakly to the fractional analogue of the Black–Scholes model. We show that there exist arbitrage opportunities in this model. One such opportunity is constructed explicitly.

Tommi Sottinen | T. Sottinen

[1] R. Gomory,et al. Fractals and Scaling in Finance: Discontinuity, Concentration, Risk. Selecta Volume E , 1997 .

[2] Ilkka Norros,et al. On the Use of Fractional Brownian Motion in the Theory of Connectionless Networks , 1995, IEEE J. Sel. Areas Commun..

[3] A. Shiryaev. Essentials of stochastic finance , 1999 .

[4] Jan Beran,et al. Statistics for long-memory processes , 1994 .

[5] P. E. Kopp,et al. Stock Price Returns and the Joseph Effect: A Fractional Version of the Black-Scholes Model , 1995 .

[6] M. Zähle. Integration with respect to fractal functions and stochastic calculus. I , 1998 .

[7] Donna Salopek,et al. Tolerance to Arbitrage , 1998 .

[8] M. Taqqu. Weak convergence to fractional brownian motion and to the rosenblatt process , 1975, Advances in Applied Probability.

[9] I. Norros,et al. An elementary approach to a Girsanov formula and other analytical results on fractional Brownian motions , 1999 .

[10] K. Dzhaparidze,et al. Introduction to option pricing in a securities market I. Binary models. Mathematics of finance, Part I , 1996 .

[11] Kacha Dzhaparidze. Introduction to option pricing in a securities market II. Poisson approximation. Mathematics of finance, Part II , 1997 .

[12] B. Mandelbrot,et al. Fractional Brownian Motions, Fractional Noises and Applications , 1968 .