无限活动跳变的VIX衍生品定价

ERN: Other Econometrics: Applied Econometric Modeling in Financial Economics - Econometrics of Corporate Finance & Governance (Topic) Pub Date : 2019-10-30 DOI:10.2139/ssrn.3478340

Jiling Cao, Xinfeng Ruan, Shu Su, Wenjun Zhang

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摘要

与Mencía和Sentana(2013)相比，本文研究了具有无限活动跳变的双因素VIX模型，该模型是减少VIX衍生品定价误差的更现实的方法。我们的双因素模型具有集中趋势、随机波动和无限活动纯跳跃lsamvy过程，其中包括方差伽玛(VG)和正态反高斯(NIG)过程作为特殊情况。我们发现经验证据表明，具有无限活动跳跃的模型优于具有有限活动跳跃的模型，特别是在VIX期权定价方面。因此，在为波动率指数衍生品定价时，不应忽视无穷大的活动跳跃。

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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Pricing VIX Derivatives with Infinite-Activity Jumps

In this paper, we investigate a two-factor VIX model with infinite-activity jumps, which is a more realistic way to reduce errors in pricing VIX derivatives, compared with Mencía and Sentana (2013). Our two-factor model features central tendency, stochastic volatility and infinite-activity pure jump Lévy processes which include the variance gamma (VG) and the normal inverse Gaussian (NIG) processes as special cases. We find empirical evidence that the model with infinite-activity jumps is superior to the models with finite-activity jumps, particularly in pricing VIX options. As a result, infinite-activity jumps should not be ignored in pricing VIX derivatives.

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ERN: Other Econometrics: Applied Econometric Modeling in Financial Economics - Econometrics of Corporate Finance & Governance (Topic)

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