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A New Representation Of The Local Volatility Surface

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Author Info
MARIANITO R. RODRIGO () (Department of Mathematics, Instituto Tecnológico Autónomo de México, Rio Hondo #1, Col. Tizapan San Angel, Mexico City, Mexico 01000, Mexico)
ROGEMAR S. MAMON (Department of Statistical and Actuarial Sciences, University of Western Ontario, Canada, 1151 Richmond Street, London, Ontario, Canada N6A 5B7, Canada)
Abstract

In this paper, we address the problem of recovering the local volatility surface from option prices consistent with observed market data. We revisit the implied volatility problem and derive an explicit formula for the implied volatility together with bounds for the call price and its derivative with respect to the strike price. The analysis of the implied volatility problem leads to the development of an ansatz approach, which is employed to obtain a semi-explicit solution of Dupire's forward equation. This solution, in turn, gives rise to a new expression for the volatility surface in terms of the price of a European call or put. We provide numerical simulations to demonstrate the robustness of our technique and its capability of accurately reproducing the volatility function.

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Publisher Info
Article provided by World Scientific Publishing Co. Pte. Ltd. in its journal International Journal of Theoretical and Applied Finance.

Volume (Year): 11 (2008)
Issue (Month): 07 ()
Pages: 691-703
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Handle: RePEc:wsi:ijtafx:v:11:y:2008:i:07:p:691-703

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Related research
Keywords: Implied volatility; Dupire's equation; inverse problem; ansatz approach; nonlinear system;

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