CEV Asymptotics of American Options
The constant elasticity of variance (CEV) model is a practical approach to option pricing by fitting to the implied volatility smile. Its application to American-style derivatives, however, poses analytical and numerical challenges. By taking the Laplace–Carson transform (LCT) to the free-boundary v...
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sg-ntu-dr.10356-813812023-02-28T19:31:30Z CEV Asymptotics of American Options Pun, Chi Seng Wong, Hoi Ying School of Physical and Mathematical Sciences Perturbation technique CEV model American options Partial differential equation The constant elasticity of variance (CEV) model is a practical approach to option pricing by fitting to the implied volatility smile. Its application to American-style derivatives, however, poses analytical and numerical challenges. By taking the Laplace–Carson transform (LCT) to the free-boundary value problem characterizing the option value function and the early exercise boundary, the analytical result involves confluent hyper-geometric functions. Thus, the numerical computation could be unstable and inefficient for certain set of parameter values. We solve this problem by an asymptotic approach to the American option pricing problem under the CEV model. We demonstrate the use of the proposed approach using perpetual and finite-time American puts. Accepted version 2016-06-21T08:28:01Z 2019-12-06T14:29:39Z 2016-06-21T08:28:01Z 2019-12-06T14:29:39Z 2013 2013 Journal Article Pun, C. S., & Wong, H. Y. (2013). CEV asymptotics of American options. Journal of Mathematical Analysis and Applications, 403(2), 451-463. 0022-247X https://hdl.handle.net/10356/81381 http://hdl.handle.net/10220/40732 10.1016/j.jmaa.2013.02.036 194821 en Journal of Mathematical Analysis and Applications © 2013 Elsevier. This is the author created version of a work that has been peer reviewed and accepted for publication by Journal of Mathematical Analysis and Applications, Elsevier. It incorporates referee’s comments but changes resulting from the publishing process, such as copyediting, structural formatting, may not be reflected in this document. The published version is available at: [http://dx.doi.org/10.1016/j.jmaa.2013.02.036]. 31 p. application/pdf |
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Perturbation technique CEV model American options Partial differential equation |
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Perturbation technique CEV model American options Partial differential equation Pun, Chi Seng Wong, Hoi Ying CEV Asymptotics of American Options |
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The constant elasticity of variance (CEV) model is a practical approach to option pricing by fitting to the implied volatility smile. Its application to American-style derivatives, however, poses analytical and numerical challenges. By taking the Laplace–Carson transform (LCT) to the free-boundary value problem characterizing the option value function and the early exercise boundary, the analytical result involves confluent hyper-geometric functions. Thus, the numerical computation could be unstable and inefficient for certain set of parameter values. We solve this problem by an asymptotic approach to the American option pricing problem under the CEV model. We demonstrate the use of the proposed approach using perpetual and finite-time American puts. |
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School of Physical and Mathematical Sciences |
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School of Physical and Mathematical Sciences Pun, Chi Seng Wong, Hoi Ying |
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Article |
| author |
Pun, Chi Seng Wong, Hoi Ying |
| author_sort |
Pun, Chi Seng |
| title |
CEV Asymptotics of American Options |
| title_short |
CEV Asymptotics of American Options |
| title_full |
CEV Asymptotics of American Options |
| title_fullStr |
CEV Asymptotics of American Options |
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CEV Asymptotics of American Options |
| title_sort |
cev asymptotics of american options |
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2016 |
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https://hdl.handle.net/10356/81381 http://hdl.handle.net/10220/40732 |
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1759857281588002816 |