A fast high-order finite difference algorithm for pricing American options |
| |
Authors: | D.Y. Tangman A. Gopaul M. Bhuruth |
| |
Affiliation: | Department of Mathematics, University of Mauritius, Reduit, Mauritius |
| |
Abstract: | We describe an improvement of Han and Wu’s algorithm [H. Han, X.Wu, A fast numerical method for the Black–Scholes equation of American options, SIAM J. Numer. Anal. 41 (6) (2003) 2081–2095] for American options. A high-order optimal compact scheme is used to discretise the transformed Black–Scholes PDE under a singularity separating framework. A more accurate free boundary location based on the smooth pasting condition and the use of a non-uniform grid with a modified tridiagonal solver lead to an efficient implementation of the free boundary value problem. Extensive numerical experiments show that the new finite difference algorithm converges rapidly and numerical solutions with good accuracy are obtained. Comparisons with some recently proposed methods for the American options problem are carried out to show the advantage of our numerical method. |
| |
Keywords: | 35K20 35R35 65N06 |
本文献已被 ScienceDirect 等数据库收录! |
|