Factor Multivariate Stochastic Volatility via Wishart Processes

This paper proposes a high dimensional factor multivariate stochastic volatility (MSV) model in which factor covariance matrices are driven by Wishart random processes. The framework allows for unrestricted specification of intertemporal sensitivities, which can capture the persistence in volatilities, kurtosis in returns, and correlation breakdowns and contagion effects in volatilities. The factor structure allows addressing high dimensional setups used in portfolio analysis and risk management, as well as modeling conditional means and conditional variances within the model framework. Owing to the complexity of the model, we perform inference using Markov chain Monte Carlo simulation from the posterior distribution. A simulation study is carried out to demonstrate the efficiency of the estimation algorithm. We illustrate our model on a data set that includes 88 individual equity returns and the two Fama–French size and value factors. With this application, we demonstrate the ability of the model to address high dimensional applications suitable for asset allocation, risk management, and asset pricing.

[1]  W. Sharpe CAPITAL ASSET PRICES: A THEORY OF MARKET EQUILIBRIUM UNDER CONDITIONS OF RISK* , 1964 .

[2]  J. Lintner THE VALUATION OF RISK ASSETS AND THE SELECTION OF RISKY INVESTMENTS IN STOCK PORTFOLIOS AND CAPITAL BUDGETS , 1965 .

[3]  G. C. Tiao,et al.  Bayesian inference in statistical analysis , 1973 .

[4]  E. Fama,et al.  Risk, Return, and Equilibrium: Empirical Tests , 1973, Journal of Political Economy.

[5]  S. Ross The arbitrage theory of capital asset pricing , 1976 .

[6]  J. Wooldridge,et al.  A Capital Asset Pricing Model with Time-Varying Covariances , 1988, Journal of Political Economy.

[7]  M. Rothschild,et al.  Asset Pricing with a Factor Arch Covariance Structure: Empirical Estimates for Treasury Bills , 1988 .

[8]  W. Andrew,et al.  LO, and A. , 1988 .

[9]  George E. P. Box,et al.  Bayesian Inference in Statistical Analysis: Box/Bayesian , 1992 .

[10]  E. Fama,et al.  Common risk factors in the returns on stocks and bonds , 1993 .

[11]  N. Shephard Partial non-Gaussian state space , 1994 .

[12]  R. Mahieu,et al.  Stochastic volatility and the distribution of exchange rate news , 1994 .

[13]  N. Shephard,et al.  Multivariate stochastic variance models , 1994 .

[14]  J. Geweke,et al.  Measuring the pricing error of the arbitrage pricing theory , 1996 .

[15]  R. Engle,et al.  Multivariate Simultaneous Generalized ARCH , 1995, Econometric Theory.

[16]  H. Uhlig Bayesian vector autoregressions with stochastic volatility , 1997 .

[17]  Tarun Chordia,et al.  Alternative factor specifications, security characteristics, and the cross-section of expected stock returns , 1998 .

[18]  T. Andersen THE ECONOMETRICS OF FINANCIAL MARKETS , 1998, Econometric Theory.

[19]  M. West,et al.  Bayesian Dynamic Factor Models and Portfolio Allocation , 2000 .

[20]  Andrew J. Patton,et al.  What good is a volatility model? , 2001 .

[21]  E. Jacquier,et al.  Asset Allocation Models and Market Volatility , 2001 .

[22]  Jun S. Liu,et al.  Monte Carlo strategies in scientific computing , 2001 .

[23]  Tim Hesterberg,et al.  Monte Carlo Strategies in Scientific Computing , 2002, Technometrics.

[24]  Yufeng Han,et al.  Asset Allocation with a High Dimensional Latent Factor Stochastic Volatility Model , 2005 .

[25]  M. McAleer Automated Inference and Learning in Modelling Financial Volatility * , 2004 .

[26]  Ioanid Roşu Graduate School of Business University of Chicago , 2005 .

[27]  N. Shephard,et al.  Analysis of high dimensional multivariate stochastic volatility models , 2006 .

[28]  M. Glickman,et al.  Multivariate Stochastic Volatility via Wishart Processes , 2006 .