Monte Carlo Methods and Path-Generation Techniques for Pricing Multi-Asset Path-Dependent Options

P. Sabino
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引用次数: 8

Abstract

We consider the problem of pricing path-dependent options on a basket of underlying assets using simulations. As an example we develop our studies using Asian options. Asian options are derivative contracts in which the underlying variable is the average price of given assets sampled over a period of time. Due to this structure, Asian options display a lower volatility and are therefore cheaper than their standard European counterparts. This paper is a survey of some recent enhancements to improve efficiency when pricing Asian options by Monte Carlo simulation in the Black-Scholes model. We analyze the dynamics with constant and time-dependent volatilities of the underlying asset returns. We present a comparison between the precision of the standard Monte Carlo method (MC) and the stratified Latin Hypercube Sampling (LHS). In particular, we discuss the use of low-discrepancy sequences, also known as Quasi-Monte Carlo method (QMC), and a randomized version of these sequences, known as Randomized Quasi Monte Carlo (RQMC). The latter has proven to be a useful variance reduction technique for both problems of up to 20 dimensions and for very high dimensions. Moreover, we present and test a new path generation approach based on a Kronecker product approximation (KPA) in the case of time-dependent volatilities. KPA proves to be a fast generation technique and reduces the computational cost of the simulation procedure.
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多资产路径依赖期权定价的蒙特卡罗方法和路径生成技术
我们考虑了基于一篮子标的资产的路径依赖期权的定价问题。例如,我们利用亚洲期权开展研究。亚洲期权是一种衍生合约,其基础变量是给定资产在一段时间内抽样的平均价格。由于这种结构,亚洲期权表现出较低的波动性,因此比标准的欧洲期权更便宜。本文综述了近年来在Black-Scholes模型中利用蒙特卡罗模拟来提高亚洲期权定价效率的一些改进。我们分析了基础资产收益的恒定和随时间波动的动态。我们比较了标准蒙特卡罗方法(MC)和分层拉丁超立方抽样(LHS)的精度。特别地,我们讨论了低差异序列的使用,也称为准蒙特卡罗方法(QMC),以及这些序列的随机版本,称为随机准蒙特卡罗(RQMC)。对于最多20维的问题和非常高维的问题,后者已被证明是一种有用的方差缩减技术。此外,我们提出并测试了一种新的基于Kronecker积近似(KPA)的路径生成方法。证明了KPA是一种快速生成技术,降低了仿真过程的计算成本。
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