Volatility is (mostly) path-dependent

IF 1.5 4区 经济学 Q3 BUSINESS, FINANCE
Julien Guyon, Jordan Lekeufack
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引用次数: 20

Abstract

We learn from data that volatility is mostly path-dependent: up to 90% of the variance of the implied volatility of equity indexes is explained endogenously by past index returns, and up to 65% for (noisy estimates of) future daily realized volatility. The path-dependency that we uncover is remarkably simple: a linear combination of a weighted sum of past daily returns and the square root of a weighted sum of past daily squared returns with different time-shifted power-law weights capturing both short and long memory. This simple model, which is homogeneous in volatility, is shown to consistently outperform existing models across equity indexes and train/test sets for both implied and realized volatility. It suggests a simple continuous-time path-dependent volatility (PDV) model that may be fed historical or risk-neutral parameters. The weights can be approximated by superpositions of exponential kernels to produce Markovian models. In particular, we propose a 4-factor Markovian PDV model which captures all the important stylized facts of volatility, produces very realistic price and (rough-like) volatility paths, and jointly fits SPX and VIX smiles remarkably well. We thus show that a continuous-time Markovian parametric stochastic volatility (actually, PDV) model can practically solve the joint SPX/VIX smile calibration problem. This article is dedicated to the memory of Peter Carr whose works on volatility modeling have been so inspiring to us.
波动性(主要)依赖于路径
我们从数据中了解到,波动性主要是路径依赖的:股票指数隐含波动率的高达90%的方差是由过去的指数回报内生解释的,而未来每日实现波动率的(嘈杂估计)高达65%。我们发现的路径依赖性非常简单:过去每日收益的加权和和过去每日收益平方的加权和的平方根的线性组合,具有不同的时移幂律权重,可以捕获短期和长期记忆。这个简单的模型在波动性上是同质的,在股票指数和训练/测试集上,对于隐含和实现的波动性,它始终优于现有的模型。它提出了一个简单的连续时间路径相关波动率(PDV)模型,可以输入历史或风险中性参数。权重可以通过指数核的叠加来近似,从而产生马尔可夫模型。特别是,我们提出了一个四因素马尔可夫PDV模型,该模型捕获了波动性的所有重要的风格化事实,产生了非常现实的价格和(粗糙的)波动路径,并且非常好地拟合了SPX和VIX。因此,我们证明了连续时间马尔可夫参数随机波动率(实际上是PDV)模型可以实际解决联合SPX/VIX微笑校准问题。这篇文章是为了纪念彼得·卡尔,他在波动率建模方面的作品给了我们很大的启发。
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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来源期刊
Quantitative Finance
Quantitative Finance 社会科学-数学跨学科应用
CiteScore
3.20
自引率
7.70%
发文量
102
审稿时长
4-8 weeks
期刊介绍: The frontiers of finance are shifting rapidly, driven in part by the increasing use of quantitative methods in the field. Quantitative Finance welcomes original research articles that reflect the dynamism of this area. The journal provides an interdisciplinary forum for presenting both theoretical and empirical approaches and offers rapid publication of original new work with high standards of quality. The readership is broad, embracing researchers and practitioners across a range of specialisms and within a variety of organizations. All articles should aim to be of interest to this broad readership.
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