亚洲期权定价的广义控制变量方法

IF 0.8 4区 经济学 Q4 BUSINESS, FINANCE
Chuan-Hsiang Han, Yongzeng Lai
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引用次数: 11

摘要

Kemna和Vorst(1990)提出的在Black-Scholes模型下评估亚洲期权的常规控制变量方法可以解释为对线性鞅控制的特定选择。我们将恒定控制参数推广到控制过程中,以获得更大的方差减小。通过期权价格逼近,构造了一种鞅控制变量方法,该方法优于传统的控制变量方法。将这种线性控制推广到非线性情况,如美国亚洲期权问题,是很简单的。从鞅的方差分析来看,控制变量方法的性能取决于近似鞅和最优鞅之间的距离。这一方法对随机波动率模型下亚洲期权等复杂问题的控制变量方法的设计有一定的帮助。我们演示了控制的多种选择,并在MC/QMC(蒙特卡罗/拟蒙特卡罗)模拟下进行了测试。在加入控制后,QMC方法效果显著,随机QMC的方差减少比增加到260倍,而带有控制的MC模拟的方差减少比增加到60倍。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Generalized Control Variate Methods for Pricing Asian Options
The conventional control variate method proposed by Kemna and Vorst (1990) to evaluate Asian options under the Black-Scholes model can be interpreted as a particular selection of linear martingale controls. We generalize the constant control parameter into a control process to gain more reduction on variance. By means of an option price approximation, we construct a martingale control variate method, which outperforms the conventional control variate method. It is straightforward to extend such linear control to a nonlinear situation such as the American Asian option problem. From the variance analysis of martingales, the performance of control variate methods depends on the distance between the approximate martingale and the optimal martingale. This measure becomes helpful for the design of control variate methods for complex problems such as Asian option under stochastic volatility models. We demonstrate multiple choices of controls and test them under MC/QMC (Monte Carlo/ Quasi Monte Carlo)- simulations. QMC methods work signicantly well after adding a control, the variance reduction ratios increase to 260 times for randomized QMC compared with 60 times for MC simulations with a control.
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
8
期刊介绍: The Journal of Computational Finance is an international peer-reviewed journal dedicated to advancing knowledge in the area of financial mathematics. The journal is focused on the measurement, management and analysis of financial risk, and provides detailed insight into numerical and computational techniques in the pricing, hedging and risk management of financial instruments. The journal welcomes papers dealing with innovative computational techniques in the following areas: Numerical solutions of pricing equations: finite differences, finite elements, and spectral techniques in one and multiple dimensions. Simulation approaches in pricing and risk management: advances in Monte Carlo and quasi-Monte Carlo methodologies; new strategies for market factors simulation. Optimization techniques in hedging and risk management. Fundamental numerical analysis relevant to finance: effect of boundary treatments on accuracy; new discretization of time-series analysis. Developments in free-boundary problems in finance: alternative ways and numerical implications in American option pricing.
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