使用随机参数回归同时估计多个选项希腊人

IF 0.8 4区 经济学 Q4 BUSINESS, FINANCE
Haifeng Fu, Xing Jin, G. Pan, Yanrong Yang
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引用次数: 4

摘要

期权价格相对于基础参数的衍生品通常被称为希腊,它们衡量期权价格对这些参数的敏感性。当期权价格的闭型解不存在,且期权的贴现支付函数不够光滑时,估算希腊人在计算上具有挑战性,特别是对于高维问题可能是一项繁重的任务。本文的目的是建立一种利用随机参数和最小二乘回归估计期权希腊值的新方法。我们的方法有几个吸引人的特点。首先,就像有限差分方法一样,它易于实现,并且不需要明确了解概率密度函数和底层随机模型的路径导数。其次,它既适用于具有不连续贴现收益的期权,也适用于具有连续贴现收益的期权。第三,也是最重要的,我们可以同时估计多个导数。通过同时估计多达50个希腊人的各种示例说明了我们的方法的性能。该算法能够产生计算效率高、精度好的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Estimating multiple option Greeks simultaneously using random parameter regression
The derivatives of option prices with respect to underlying parameters are commonly referred to as Greeks, and they measure the sensitivities of option prices to these parameters. When the closed-form solutions for option prices do not exist and the discounted payoff functions of the options are not sufficiently smooth, estimating Greeks is computationally challenging and could be a burdensome task for high-dimensional problems in particular. The aim of this paper is to develop a new method for estimating option Greeks by using random parameters and least-squares regression. Our approach has several attractive features. First, just like the finite-difference method it is easy to implement and does not require explicit knowledge of the probability density function and the pathwise derivative of the underlying stochastic model. Second, it can be applied to options with discontinuous discounted payoffs as well as options with continuous discounted payoffs. Third, and most importantly, we can estimate multiple derivatives simultaneously. The performance of our approach is illustrated for a variety of examples with up to fifty Greeks estimated simultaneously. The algorithm is able to produce computationally efficient results with good accuracy.
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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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