期权估值的波动率长期记忆:分量Garch与部分积分Garch

IF 0.4 4区经济学 Q4 BUSINESS, FINANCE

Journal of Derivatives Pub Date : 2009-07-23 DOI:10.2139/ssrn.1438001

Yintian Wang

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引用次数: 1

摘要

波动性长内存是一个程式化的事实，已经被记录了很长时间。现有文献对长记忆波动率进行建模的方法有两种:成分波动率模型和分数积分波动率模型。本文建立了一个新的分数积分GARCH模型，并利用标准普尔500指数的收益率和欧式期权的横截面数据对其性能进行了研究。分数集成的GARCH模型比简单的GARCH(1,1)模型产生的期权定价误差少37%，显著优于简单的GARCH(1,1)模型。由于具有更强的波动性持续性，该模型还主导了以其出色的期权定价性能而享有盛誉的成分波动率模型，其产生的期权定价误差减少了15%。我们还验证了分数积分GARCH模型对最新期权价格的鲁棒性。本文指出，捕获波动持续性是未来研究的一个很有前途的方向。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Volatility Long Memory on Option Valuation: Component Garch versus Fractionally Integrated GARCH

Volatility long memory is a stylized fact that has been documented for a long time. Existing literature have two ways to model volatility long memory: component volatility models and fractionally integrated volatility models. This paper develops a new fractionally integrated GARCH model, and investigates its performance by using the Standard and Poor’s 500 index returns and cross-sectional European option data. The fractionally integrated GARCH model significantly outperforms the simple GARCH(1, 1) model by generating 37% less option pricing errors. With stronger volatility persistence, it also dominates a component volatility model, who has enjoyed a reputation for its outstanding option pricing performance, by generating 15% less option pricing errors. We also confirm the fractionally integrated GARCH model’s robustness with the latest option prices. This paper indicates that capturing volatility persistence represents a very promising direction for future study.

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来源期刊

Journal of Derivatives Economics, Econometrics and Finance-Economics and Econometrics

CiteScore

1.30

自引率

14.30%

发文量

期刊介绍： The Journal of Derivatives (JOD) is the leading analytical journal on derivatives, providing detailed analyses of theoretical models and how they are used in practice. JOD gives you results-oriented analysis and provides full treatment of mathematical and statistical information on derivatives products and techniques. JOD includes articles about: •The latest valuation and hedging models for derivative instruments and securities •New tools and models for financial risk management •How to apply academic derivatives theory and research to real-world problems •Illustration and rigorous analysis of key innovations in derivative securities and derivative markets