Affiliation:
1. School of Mathematics Jilin University Changchun China
2. School of Mathematical Sciences Shanghai Jiao Tong University Shanghai China
3. Shenzhen International Center for Industrial and Applied Mathematics Shenzhen Research Institute of Big Data Shenzhen China
4. School of Science and Engineering The Chinese University of Hong Kong Shenzhen China
Abstract
AbstractThis paper focuses on numerical algorithms to value American options under regime switching. The prices of such options satisfy a set of complementary parabolic problems on an unbounded domain. Based on our previous experience, the pricing model could be truncated into a linear complementarity problem (LCP) over a bounded domain. In addition, we transform the resulting LCP into an equivalent variational problem (VP), and discretize the VP by an Euler‐finite element method. Since the variational matrix in the discretized system is P‐matrix, a primal‐dual active set (PDAS) algorithm is proposed to evaluate the option prices efficiently. As a specialty of PDAS, the optimal exercise boundaries in all regimes are obtained without further computation cost. Finally, numerical simulations are carried out to test the performance of our proposed algorithm and compare it to existing methods.
Funder
Natural Science Foundation of Jilin Province
Chinese University of Hong Kong, Shenzhen
Ministry of Education of China
National Natural Science Foundation of China
National Key Research and Development Program of China