Download This PaperMultivariate Affine GARCH with Heavy Tails: A Unified Framework for Portfolio Optimization and Option Valuation
32 Pages Posted: 19 May 2025
Date Written: May 19, 2025
Abstract
This paper develops and estimates a multivariate affine GARCH(1,1) model with Normal Inverse Gaussian innovations that captures time-varying volatility, heavy tails, and dynamic correlation across asset returns. We generalize the Heston-Nandi framework to a multivariate setting and apply it to 30 Dow Jones Industrial Average stocks. The model jointly supports three core financial applications: dynamic portfolio optimization, wealth path simulation, and option pricing. Closed-form solutions are derived for a Constant Relative Risk Aversion (CRRA) investor's intertemporal asset allocation, and we implement a forward-looking risk-adjusted performance comparison against Merton-style constant strategies. Using the model's conditional volatilities, we also construct implied volatility surfaces for European options, capturing skew and smile features. Empirically, we document substantial wealth-equivalent utility losses from ignoring time-varying correlation and tail risk. These findings underscore the value of a unified econometric framework for analyzing joint asset dynamics and for managing portfolio and derivative exposures under non-Gaussian risks.
Keywords: Option Pricing, Multivariate Affine GARCH, Portfolio Optimization, Wealth Accumulation. JEL Codes: G10, G11, G13, G17
JEL Classification: G10, G11, G13, G17
Suggested Citation: Suggested Citation
Frank J. Fabozzi
Johns Hopkins University - Carey Business School ( email )
100 International Drive
Baltimore, MD 21202
United States