Analysis of Markov Chain Approximation for Option Pricing and Hedging: Grid Design and Convergence Behavior
成果类型:
Article
署名作者:
Zhang, Gongqiu; Li, Lingfei
署名单位:
The Chinese University of Hong Kong, Shenzhen; Chinese University of Hong Kong
刊物名称:
OPERATIONS RESEARCH
ISSN/ISSBN:
0030-364X
DOI:
10.1287/opre.2018.1791
发表日期:
2019
页码:
407-427
关键词:
general framework
eigenfunction
derivatives
difference
valuation
models
摘要:
Continuous time Markov chain (CTMC) approximation is an intuitive and powerful method for pricing options in general Markovian models. This paper analyzes how grid design affects the convergence behavior of barrier and European options in general diffusion models. Using the spectral method, we obtain sharp estimates for the convergence rate of option price for nonuniform grids. We propose to calculate an option's delta and gamma by taking central difference of option prices on the grid. For this simple method, we prove that, surprisingly, delta and gamma converge at the same rate as option price does. Our analysis allows us to develop principles that are sufficient and necessary for designing nonuniform grids that can achieve second-order convergence for option price, delta, and gamma. Based on these principles, we propose a novel class of nonuniform grids that ensure that convergence is not only second order but also, smooth. This further allows extrapolation to be applied to achieve even higher convergence rate. Our grids enable the CTMC approximation method to price and hedge a large number of options with different strikes fast and accurately. Applicability of our results to jump models is discussed through numerical examples.
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