Pricing American options written on two underlying assets
This paper extends the integral transform approach of McKean [<italic>Ind. Manage. Rev.</italic>, 1965, <bold>6</bold>, 32--39] and Chiarella and Ziogas [<italic>J. Econ. Dyn. Control</italic>, 2005, <bold>29</bold>, 229--263] to the pricing of American options written on more than one underlying asset under the Black and Scholes [<italic>J. Polit. Econ.</italic>, 1973, <bold>81</bold>, 637--659] framework. A bivariate transition density function of the two underlying stochastic processes is derived by solving the associated backward Kolmogorov partial differential equation. Fourier transform techniques are used to transform the partial differential equation to a corresponding ordinary differential equation whose solution can be readily found by using the integrating factor method. An integral expression of the American option written on any two assets is then obtained by applying Duhamel's principle. A numerical algorithm for calculating American spread call option prices is given as an example, with the corresponding early exercise boundaries approximated by linear functions. Numerical results are presented and comparisons made with other alternative approaches.
Year of publication: |
2014
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Authors: | Chiarella, Carl ; Ziveyi, Jonathan |
Published in: |
Quantitative Finance. - Taylor & Francis Journals, ISSN 1469-7688. - Vol. 14.2014, 3, p. 409-426
|
Publisher: |
Taylor & Francis Journals |
Saved in:
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