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Nonconvergence in the Variation of the Hedging Strategy of a European Call Option

R. Th. Peters
University of Amsterdam - Korteweg-de Vries Institute for Mathematics

Mathematical Finance, Vol. 13, pp. 467-480, October 2003

Abstract:
In this paper we consider the variation of the hedging strategy of a European call option when the underlying asset follows a binomial tree. In a binomial tree model the hedging strategy of a European call option converges to a continuous process when the number of time points increases so that the price process of the underlying asset converges to a Brownian motion, the Bachelier model. However, the variation of the hedging strategy need not converge to the variation of the limit process. In fact, it is shown that the asymptotic variation of the hedging strategy may be of any order.

Accepted Paper Series

Date posted: October 13, 2003 ; Last revised: October 13, 2003

Suggested Citation

Peters, R. Th., Nonconvergence in the Variation of the Hedging Strategy of a European Call Option. Mathematical Finance, Vol. 13, pp. 467-480, October 2003. Available at SSRN: http://ssrn.com/abstract=440045

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R. Th. Peters (Contact Author)

University of Amsterdam - Korteweg-de Vries Institute for Mathematics ( email )

Netherlands
+31 20 525 5217 (Phone)