English

A generalized nonlinear model for long memory conditional heteroscedasticity

Statistics Theory 2016-03-08 v2 Statistics Theory

Abstract

We study the existence and properties of stationary solution of ARCH-type equation rt=ζtσtr_t= \zeta_t \sigma_t, where ζt\zeta_t are standardized i.i.d. r.v.'s and the conditional variance satisfies an AR(1) equation σt2=Q2(a+j=1bjrtj)+γσt12\sigma^2_t = Q^2\big(a + \sum_{j=1}^\infty b_j r_{t-j}\big) + \gamma \sigma^2_{t-1} with a Lipschitz function Q(x)Q(x) and real parameters a,γ,bja, \gamma, b_j . The paper extends the model and the results in Doukhan et al. (2015) from the case γ=0\gamma = 0 to the case 0<γ<10< \gamma < 1. We also obtain a new condition for the existence of higher moments of rtr_t which does not include the Rosenthal constant. In particular case when QQ is the square root of a quadratic polynomial, we prove that rtr_t can exhibit a leverage effect and long memory. We also present simulated trajectories and histograms of marginal density of σt\sigma_t for different values of γ\gamma.

Cite

@article{arxiv.1509.01708,
  title  = {A generalized nonlinear model for long memory conditional heteroscedasticity},
  author = {Ieva Grublytė and Andrius Škarnulis},
  journal= {arXiv preprint arXiv:1509.01708},
  year   = {2016}
}
R2 v1 2026-06-22T10:49:54.514Z