Primal-dual simulation algorithm for pricing multidimensional American options
成果类型:
Article
署名作者:
Andersen, L; Broadie, M
署名单位:
Columbia University
刊物名称:
MANAGEMENT SCIENCE
ISSN/ISSBN:
0025-1909
DOI:
10.1287/mnsc.1040.0258
发表日期:
2004
页码:
1222-1234
关键词:
AMERICAN OPTIONS
Bermudan options
Bermudan swaptions
Monte Carlo simulation
Libor market model
option pricing
multiple state variables
Real options
摘要:
This paper describes a practical algorithm based on Monte Carlo simulation for the pricing of multidimensional American (i.e., continuously exercisable) and Bermudan (i.e., discretely exercisable) options. The method generates both lower and upper bounds for the Bermudan option price and hence gives valid confidence intervals for the true value. Lower bounds can be generated using any number of primal algorithms. Upper bounds are generated using a new Monte Carlo a ialgorithm based on the duality representation of the Bermudan value function suggested independently in Haugh and Kogan (2004) and Rogers (2002). Our proposed algorithm can handle virtually any type of process dynamics, factor structure, and payout specification. Computational results for a variety of multifactor equity and interest-rate options demonstrate the simplicity and efficiency of the proposed algorithm. In particular, we use the proposed method to examine and verify the tightness of frequently used exercise rules in Bermudan swaption markets.