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Nonconvergence in the Variation of the Hedging Strategy of a European Call Option
Author(s) -
Peters R. Th.
Publication year - 2003
Publication title -
mathematical finance
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.98
H-Index - 81
eISSN - 1467-9965
pISSN - 0960-1627
DOI - 10.1111/1467-9965.t01-1-00176
Subject(s) - binomial options pricing model , call option , variation (astronomy) , asset (computer security) , econometrics , limit (mathematics) , economics , valuation of options , mathematics , mathematical economics , computer science , mathematical analysis , physics , computer security , astrophysics
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.
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