A new integral equation formulation for American put options |
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Authors: | Song-Ping Zhu Xin-Jiang He XiaoPing Lu |
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Institution: | Institute for Mathematics and its Applications, School of Mathematics and Applied Statistics, University of Wollongong, Wollongong, NSW, 2522Australia. |
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Abstract: | In this paper, a completely new integral equation for the price of an American put option as well as its optimal exercise price is successfully derived. Compared to existing integral equations for pricing American options, the new integral formulation has two distinguishable advantages: (i) it is in a form of one-dimensional integral, and (ii) it is in a form that is free from any discontinuity and singularities associated with the optimal exercise boundary at the expiry time. These rather unique features have led to a significant enhancement of the computational accuracy and efficiency as shown in the examples. |
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Keywords: | Integral equation American put options Computational accuracy and efficiency |
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