General duality for perpetual American options

Aurélien Alfonsi; Benjamin Jourdain

doi:10.1142/S0219024908004920

General duality for perpetual American options

TU Berlin

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we investigate the generalization of the Call-Put duality equality obtained in Alfonsi and Jourdain (preprint, 2006, available at ) for perpetual American options when the Call-Put payoff (y - x)⁺ is replaced by φ(x,y). It turns out that the duality still holds under monotonicity and concavity assumptions on φ. The specific analytical form of the Call-Put payoff only makes calculations easier but is not crucial unlike in the derivation of the Call-Put duality equality for European options. Last, we give some examples for which the optimal strategy is known explicitly.

Original language	English
Pages (from-to)	545-566
Number of pages	22
Journal	International Journal of Theoretical and Applied Finance
Volume	11
Issue number	6
DOIs	https://doi.org/10.1142/S0219024908004920
Publication status	Published - 1 Sept 2008

Keywords

Calibration of volatility
Call-Put duality
Dupire's formula
Optimal stopping
Perpetual American options

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10.1142/S0219024908004920

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abstract = "In this paper, we investigate the generalization of the Call-Put duality equality obtained in Alfonsi and Jourdain (preprint, 2006, available at ) for perpetual American options when the Call-Put payoff (y - x)+ is replaced by φ(x,y). It turns out that the duality still holds under monotonicity and concavity assumptions on φ. The specific analytical form of the Call-Put payoff only makes calculations easier but is not crucial unlike in the derivation of the Call-Put duality equality for European options. Last, we give some examples for which the optimal strategy is known explicitly.",

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KW - Calibration of volatility

KW - Call-Put duality

KW - Dupire's formula

KW - Optimal stopping

KW - Perpetual American options

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General duality for perpetual American options

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Keywords

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