波动率建模中的观测数据偏差信息准则

On the Observed-Data Deviance Information Criterion for Volatility Modeling

Journal of Financial Econometrics · 2016
被引 72
ABS 3

中文导读

提出基于快速带状矩阵算法的重要性抽样方法,用于计算随机波动率模型的观测数据似然,进而计算偏差信息准则(DIC),避免条件DIC倾向于过拟合的问题,并应用于标普500指数日收益率数据。

Abstract

We propose importance sampling algorithms based on fast band matrix routines for estimating the observed-data likelihoods for a variety of stochastic volatility models. This is motivated by the problem of computing the deviance information criterion (DIC)—a popular Bayesian model comparison criterion that comes in a few variants. Although the DIC based on the conditional likelihood—obtained by conditioning on the latent variables—is widely used for comparing stochastic volatility models, recent studies have argued against its use on both theoretical and practical grounds. Indeed, we show via a Monte-Carlo study that the conditional DIC tends to favor overfitted models, whereas the DIC based on the observed-data likelihood—calculated using the proposed importance sampling algorithms—seems to perform well. We demonstrate the methodology with an application involving daily returns on the Standard & Poors 500 index.

贝叶斯统计波动率建模模型比较蒙特卡洛方法金融计量经济学