Bayesian estimation of stochastic tail index from high-frequency financial data

Tails of the return distribution of an asset are informative about the (financial) risk behavior of that asset. Stochastic tail index (STI) models are designed to quantify riskiness by estimating a time-varying tail index from the distribution of extreme values using high-frequency financial data. I...

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Bibliographic Details
Published in:Empirical economics 2021-11, Vol.61 (5), p.2685-2711
Main Authors: Doğan, Osman, Taşpınar, Süleyman, Bera, Anil K.
Format: Article
Language:English
Subjects:
Algorithms
Assets
Bayesian analysis
Deviance
Econometrics
Economic theory
Economic Theory/Quantitative Economics/Mathematical Methods
Economics
Economics and Finance
Finance
High frequency trading
Insurance
Management
Risk behavior
Sexually transmitted diseases
Sparsity
Statistics for Business
STD
Stock exchanges
Volatility
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Summary:Tails of the return distribution of an asset are informative about the (financial) risk behavior of that asset. Stochastic tail index (STI) models are designed to quantify riskiness by estimating a time-varying tail index from the distribution of extreme values using high-frequency financial data. In this paper, we propose a computationally efficient Bayesian estimation method for STI models based on the recent advances in band and sparse matrix algorithms. We then show how the deviance information criterion (DIC) can be calculated from the integrated likelihood function for model comparison exercises. In a Monte Carlo study, we investigate the finite sample properties of the Bayesian estimator as well as the performance of two DIC measures. Our results show that the Bayesian estimator performs sufficiently well and the DIC measures based on the integrated likelihood function are useful for model selection exercises. In an empirical application, we illustrate calculation of the tail index using high-frequency data on IBM stock returns. Our estimation results indicate that the daily tail index of the return distribution of IBM stock has a time-varying feature: It tends to decline when there are large losses, whereas it tends to increase when there are small losses.
ISSN:0377-7332
1435-8921
DOI:10.1007/s00181-020-01969-2