A nonlinear model for long memory conditional heteroscedasticity

Abstract

We discuss a class of conditionally heteroscedastic time series models satisfying the equation rt= ζt σt, where ζt are standardized i.i.d. r.v.'s and the conditional standard deviation σt is a nonlinear function Q of inhomogeneous linear combination of past values rs, s<t with coefficients bj. The existence of stationary solution rt with finite pth moment, 0< p < ∞ is obtained under some conditions on Q, bj and pth moment of ζ0. Weak dependence properties of rt are studied, including the invariance principle for partial sums of Lipschitz functions of rt. In the case of quadratic Q2, we prove that rt can exhibit a leverage effect and long memory, in the sense that the squared process r2t has long memory autocorrelation and its normalized partial sums process converges to a fractional Brownian motion.