Periodic Stochastic Volatility and Fat Tails

This article provides a comprehensive analysis of the size and statistical significance of the day of the week, month of the year, and holiday effects in daily stock index returns and volatility. We employ data from the Dow Jones Industrial Average (DJIA), the S&P 500, the S&P MidCap 400, and the S&P SmallCap 600 in order to test whether the seasonal patterns of medium and small firms are similar to those of large firms. Using formal hypothesis tests based on bootstrapping, we demonstrate that there are more significant calendar effects in volatility than in expected returns, especially for the two large cap indices. More importantly, we introduce the periodic stochastic volatility (PSV) model for characterizing the observed seasonal patterns of daily financial market volatility. We analyze the interaction between seasonal heteroskedasticity and fat tails by comparing the performance of Gaussian PSV and fat-tailed PSVt specifications to the plain vanilla SV and SVt benchmarks. Consistent with our model-free results, we find strong evidence of seasonal periodicity in volatility, which essentially eliminates the need for a fat-tailed conditional distribution, and is robust to the exclusion of the crash of 1987 outliers. Copyright 2006, Oxford University Press.

[1]  Anthony D. Hall,et al.  Using Bayesian Variable Selection Methods to Choose Style Factors in Global Stock Return Models , 2000 .

[2]  T. Bollerslev,et al.  Intraday periodicity and volatility persistence in financial markets , 1997 .

[3]  Seymour Smidt,et al.  Volume for Winners and Losers: Taxation and Other Motives for Stock Trading , 1986 .

[4]  M. Rosenblatt Remarks on a Multivariate Transformation , 1952 .

[5]  Siem Jan Koopman,et al.  Estimation of stochastic volatility models via Monte Carlo maximum likelihood , 1998 .

[6]  Alan G. White,et al.  The Pricing of Options on Assets with Stochastic Volatilities , 1987 .

[7]  J. Geweke,et al.  Bayesian Inference in Econometric Models Using Monte Carlo Integration , 1989 .

[8]  H. Berument,et al.  The day of the week effect on stock market volatility , 2001 .

[9]  Allan Timmermann,et al.  Dangers of data mining: the case of calendar effects in stock returns , 2001 .

[10]  Josef Lakonishok,et al.  Are Seasonal Anomalies Real? A Ninety-Year Perspective , 1988 .

[11]  S. Chib,et al.  Marginal Likelihood From the Metropolis–Hastings Output , 2001 .

[12]  Peter E. Rossi,et al.  Bayesian Analysis of Stochastic Volatility Models , 1994 .

[13]  M. Flannery,et al.  From T-Bills to Common Stocks: Investigating the Generality of Intra-Week Return Seasonality , 1988 .

[14]  K. French Stock returns and the weekend effect , 1980 .

[15]  J. Q. Smith,et al.  1. Bayesian Statistics 4 , 1993 .

[16]  Maurice D. Levi,et al.  Weekend Effects on Stock Returns: A Note , 1982 .

[17]  Robert Haugen,et al.  The incredible January effect , 1987 .

[18]  John Geweke,et al.  Evaluating the accuracy of sampling-based approaches to the calculation of posterior moments , 1991 .

[19]  K. French,et al.  Stock return variances: The arrival of information and the reaction of traders , 1986 .

[20]  A. Gallant,et al.  On the bias in flexible functional forms and an essentially unbiased form : The fourier flexible form , 1981 .

[21]  Josef Lakonishok,et al.  The Weekend Effect: Trading Patterns of Individual and Institutional Investors , 1990 .

[22]  Marc R. Reinganum The anomalous stock market behavior of small firms in January: Empirical tests for tax-loss selling effects , 1983 .

[23]  L. Shenton,et al.  Omnibus test contours for departures from normality based on √b1 and b2 , 1975 .

[24]  P. Franses,et al.  Modelling day-of-the-week seasonality in the S&P 500 index , 2000 .

[25]  Eric Ghysels,et al.  Periodic Autoregressive Conditional Heteroskedasticity , 1996 .

[26]  E. Balaban,et al.  Stock returns, seasonality and asymmetric conditional volatility in world equity markets , 2001 .

[27]  Peter E. Rossi,et al.  Stock Prices and Volume , 1992 .

[28]  Stephen H. Penman,et al.  The distribution of earnings news over time and seasonalities in aggregate stock returns , 1987 .

[29]  Asger Lunde,et al.  Testing the Significance of Calendar Effects , 2005 .

[30]  Donald B. Keim SIZE-RELATED ANOMALIES AND STOCK RETURN SEASONALITY Further Empirical Evidence , 1983 .

[31]  S. Chib Marginal Likelihood from the Gibbs Output , 1995 .

[32]  L. Wasserman,et al.  Computing Bayes Factors by Combining Simulation and Asymptotic Approximations , 1997 .

[33]  N. Shephard,et al.  Stochastic Volatility: Likelihood Inference And Comparison With Arch Models , 1996 .

[34]  John R. Nofsinger,et al.  ON STOCK RETURN SEASONALITY AND CONDITIONAL HETEROSKEDASTICITY , 1998 .

[35]  Anat R. Admati,et al.  Divide and Conquer: A Theory of Intraday and Day-of-the-Week Mean Effects , 1989 .

[36]  Richard J. Rogalski A Further Investigation of the Weekend Effect in Stock Returns , 1984 .

[37]  R. Baillie,et al.  The Message in Daily Exchange Rates , 1989 .

[38]  Chris Kirby,et al.  A Closer Look at the Relation between GARCH and Stochastic Autoregressive Volatility , 2003 .

[39]  J. Ritter The Buying and Selling Behavior of Individual Investors at the Turn of the Year , 1988 .

[40]  Andrea Beltratti,et al.  Computing value at risk with high frequency data , 1999 .

[41]  Anat R. Admati,et al.  A Theory of Intraday Patterns: Volume and Price Variability , 1988 .

[42]  N. Shephard,et al.  Markov chain Monte Carlo methods for stochastic volatility models , 2002 .

[43]  M. Pitt,et al.  Filtering via Simulation: Auxiliary Particle Filters , 1999 .

[44]  Analysis of the predictive ability of information accumulated over nights, weekends and holidays , 2004 .

[45]  L. Glosten,et al.  On the Relation between the Expected Value and the Volatility of the Nominal Excess Return on Stocks , 1993 .

[46]  Jeremy Berkowitz Testing Density Forecasts, With Applications to Risk Management , 2001 .