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EVALUATING HEDGING ERRORS: AN ASYMPTOTIC APPROACH
Author(s) -
Hayashi Takaki,
Mykland Per A.
Publication year - 2005
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/j.0960-1627.2005.00221.x
Subject(s) - trading strategy , parametric statistics , volatility (finance) , derivative (finance) , econometrics , discrete time and continuous time , benchmark (surveying) , financial market , convergence (economics) , mathematical optimization , economics , computer science , mathematical economics , mathematics , financial economics , finance , statistics , geodesy , economic growth , geography
We propose a methodology for evaluating the hedging errors of derivative securities due to the discreteness of trading times or the observation times of market prices, or both. Utilizing a weak convergence approach, we derive the asymptotic distributions of the hedging errors as the discreteness disappears in several situations. First, we examine the hedging error due to discrete‐time trading when the true strategy is known, which generalizes the result of Bertsimas, Kogan, and Lo (2000) to continuous Itô processes. Then we consider a data‐driven strategy, when the true strategy is unknown. This strategy is free of parametric model assumptions, therefore it is expected to serve as a benchmark for the evaluation of parametric strategies. Finally, we consider a case study of the Black‐Scholes delta‐hedging strategy when the volatility is unknown in the proposed framework. The results obtained give us a prospect for further developments of the framework under which various parametric strategies could be compared in a unified manner.