Least squares Monte Carlo methods in stochastic Volterra rough volatility models

IF 0.8 4区经济学 Q4 BUSINESS, FINANCE Journal of Computational Finance Pub Date : 2021-05-10 DOI:10.21314/jcf.2022.027

H. Guerreiro, João Guerra

{"title":"Least squares Monte Carlo methods in stochastic Volterra rough volatility models","authors":"H. Guerreiro, João Guerra","doi":"10.21314/jcf.2022.027","DOIUrl":null,"url":null,"abstract":"In stochastic Volterra rough volatility models, the volatility follows a truncated Brownian semi-stationary process with stochastic vol-of-vol. Recently, efficient VIX pricing Monte Carlo methods have been proposed for the case where the vol-of-vol is Markovian and independent of the volatility. Following recent empirical data, we discuss the VIX option pricing problem for a generalized framework of these models, where the vol-of-vol may depend on the volatility and/or not be Markovian. In such a setting, the aforementioned Monte Carlo methods are not valid. Moreover, the classical least squares Monte Carlo faces exponentially increasing complexity with the number of grid time steps, whilst the nested Monte Carlo method requires a prohibitive number of simulations. By exploring the infinite dimensional Markovian representation of these models, we device a scalable least squares Monte Carlo for VIX option pricing. We apply our method firstly under the independence assumption for benchmarks, and then to the generalized framework. We also discuss the rough vol-of-vol setting, where Markovianity of the vol-of-vol is not present. We present simulations and benchmarks to establish the efficiency of our method. Keywords— VIX, rough volatility, stochastic Volterra models, least squares Monte Carlo, volatility of volatility ∗Supported by FCT Grant SFRH/BD/147161/2019. †Partially supported by the project CEMAPRE/REM-UiDB/05069/2020 financed by FCT/MCTES through national funds. 1 ar X iv :2 10 5. 04 51 1v 1 [ qfi n. PR ] 1 0 M ay 2 02 1","PeriodicalId":51731,"journal":{"name":"Journal of Computational Finance","volume":" ","pages":""},"PeriodicalIF":0.8000,"publicationDate":"2021-05-10","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"1","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of Computational Finance","FirstCategoryId":"96","ListUrlMain":"https://doi.org/10.21314/jcf.2022.027","RegionNum":4,"RegionCategory":"经济学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q4","JCRName":"BUSINESS, FINANCE","Score":null,"Total":0}

引用次数: 1

Abstract

In stochastic Volterra rough volatility models, the volatility follows a truncated Brownian semi-stationary process with stochastic vol-of-vol. Recently, efficient VIX pricing Monte Carlo methods have been proposed for the case where the vol-of-vol is Markovian and independent of the volatility. Following recent empirical data, we discuss the VIX option pricing problem for a generalized framework of these models, where the vol-of-vol may depend on the volatility and/or not be Markovian. In such a setting, the aforementioned Monte Carlo methods are not valid. Moreover, the classical least squares Monte Carlo faces exponentially increasing complexity with the number of grid time steps, whilst the nested Monte Carlo method requires a prohibitive number of simulations. By exploring the infinite dimensional Markovian representation of these models, we device a scalable least squares Monte Carlo for VIX option pricing. We apply our method firstly under the independence assumption for benchmarks, and then to the generalized framework. We also discuss the rough vol-of-vol setting, where Markovianity of the vol-of-vol is not present. We present simulations and benchmarks to establish the efficiency of our method. Keywords— VIX, rough volatility, stochastic Volterra models, least squares Monte Carlo, volatility of volatility ∗Supported by FCT Grant SFRH/BD/147161/2019. †Partially supported by the project CEMAPRE/REM-UiDB/05069/2020 financed by FCT/MCTES through national funds. 1 ar X iv :2 10 5. 04 51 1v 1 [ qfi n. PR ] 1 0 M ay 2 02 1

查看原文

微信好友朋友圈 QQ好友复制链接

本刊更多论文

随机Volterra粗糙波动模型的最小二乘蒙特卡罗方法

在随机Volterra粗糙波动率模型中，波动率遵循具有随机vol-of-vol的截断布朗半平稳过程。最近，针对体积为马尔可夫且与波动率无关的情况，提出了有效的VIX定价蒙特卡罗方法。根据最近的经验数据，我们讨论了这些模型的广义框架的波动率指数期权定价问题，其中波动率的波动率可能取决于波动率和/或不是马尔可夫的。在这种情况下，上述蒙特卡罗方法是无效的。此外，经典的最小二乘蒙特卡罗方法面临着随着网格时间步长的增加而呈指数级增加的复杂性，而嵌套蒙特卡罗方法需要大量的模拟。通过探索这些模型的无限维马尔可夫表示，我们为VIX期权定价提供了一个可扩展的最小二乘蒙特卡罗方法。我们首先将我们的方法应用于基准的独立性假设下，然后应用于广义框架。我们还讨论了体积设置的粗略体积，其中体积的马尔可夫性不存在。我们提供了模拟和基准来确定我们的方法的效率。关键词——波动率指数，粗略波动率，随机Volterra模型，最小二乘蒙特卡罗，波动率波动率*由FCT Grant SFRH/BD/147161/2019支持。†部分由FCT/MCTES通过国家基金资助的CEMAPRE/REM UiDB/05069/2020项目支持。1 ar X iv：2 10 5。04 51 1v 1[qfi.PR]1 0 May 2 1

本文章由计算机程序翻译，如有差异，请以英文原文为准。

求助全文

约1分钟内获得全文去求助

来源期刊

Journal of Computational Finance BUSINESS, FINANCE-

CiteScore

0.90

自引率

0.00%

发文量

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.