Affiliation:
1. Department of Mathematical Sciences, College of Basic and Applied Sciences, Middle Tennessee State University, Murfreesboro, TN 37132, USA
Abstract
Option pricing is an important research field in financial markets, and the American option is a common financial derivative. Fast and accurate pricing solutions are critical to the stability and development of the market. Computational techniques, especially the least squares Monte Carlo (LSMC) method, have been broadly used in optimizing the pricing algorithm. This paper discusses the application of distributed computing technology to enhance the LSMC in American option pricing. Although parallel computing has been used to improve the LSMC method, this paper is the first to explore distributed computing technology for LSMC enhancement. Compared with parallel computing, distributed computing has several advantages, including reducing the computational complexity by the “divide and conquer” method, avoiding the complicated matrix transformation, and improving data privacy as well as security. Moreover, LSMC is suitable for distributed computing because the price paths can be simulated and regressed separately. This research aims to show how distributed computing, particularly the divide and conquer approach implemented by Apache Spark, can be used to improve the efficiency and accuracy of LSMC in American option pricing. This paper provides an innovative solution to the financial market and could contribute to the advancement of American option pricing research.
Subject
Strategy and Management,Economics, Econometrics and Finance (miscellaneous),Accounting
Reference26 articles.
1. Bauer, Daniel, Bergmann, Daniela, and Reuss, Andreas (2010). Proceedings of the 2010 ICA Congress, Citeseer.
2. The pricing of options and corporate liabilities;Black;Journal of Political Economy,1973
3. Accelerating the least-square monte carlo method with parallel computing;Chen;The Journal of Supercomputing,2015
4. Deep neural network framework based on backward stochastic differential equations for pricing and hedging american options in high dimensions;Chen;Quantitative Finance,2021
5. An analysis of a least squares regression method for american option pricing;Lamberton;Finance and Stochastics,2002