Parameter Estimation of the Heston Volatility Model with Jumps in the Asset Prices

IF 1.1 Q3 ECONOMICS

Econometrics Pub Date : 2022-11-27 DOI:10.3390/econometrics11020015

Jarosław Gruszka , Janusz Szwabi'nski

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引用次数: 2

Abstract

The parametric estimation of stochastic differential equations (SDEs) has been the subject of intense studies already for several decades. The Heston model, for instance, is based on two coupled SDEs and is often used in financial mathematics for the dynamics of asset prices and their volatility. Calibrating it to real data would be very useful in many practical scenarios. It is very challenging, however, since the volatility is not directly observable. In this paper, a complete estimation procedure of the Heston model without and with jumps in the asset prices is presented. Bayesian regression combined with the particle filtering method is used as the estimation framework. Within the framework, we propose a novel approach to handle jumps in order to neutralise their negative impact on the estimates of the key parameters of the model. An improvement in the sampling in the particle filtering method is discussed as well. Our analysis is supported by numerical simulations of the Heston model to investigate the performance of the estimators. In addition, a practical follow-along recipe is given to allow finding adequate estimates from any given data.

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考虑资产价格跳变的Heston波动率模型的参数估计

随机微分方程(SDEs)的参数估计已经成为几十年来研究的热点。例如，赫斯顿模型基于两个耦合的sde，经常在金融数学中用于资产价格及其波动性的动态。在许多实际场景中，将其校准为真实数据将非常有用。然而，这是非常具有挑战性的，因为波动性是无法直接观察到的。本文给出了无资产价格跳跃和有资产价格跳跃的赫斯顿模型的完整估计过程。采用贝叶斯回归和粒子滤波相结合的方法作为估计框架。在该框架内，我们提出了一种新的方法来处理跳跃，以抵消它们对模型关键参数估计的负面影响。文中还讨论了粒子滤波方法中采样的改进。我们的分析得到了Heston模型的数值模拟的支持，以研究估计器的性能。此外，还提供了一个实用的后续方法，以便从任何给定的数据中找到适当的估计。

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

Econometrics Economics, Econometrics and Finance-Economics and Econometrics

CiteScore

2.40

自引率

20.00%

发文量

审稿时长

11 weeks