Limit theorems for integral functionals of Hermite-driven processes

Abstract

Consider a moving average process X of the form X(t)=∫-∞t x(t-u)dZu, t≥ 0, where Z is a (non Gaussian) Hermite process of order q≥ 2 and x:R+ is sufficiently integrable. This paper investigates the fluctuations, as T∞, of integral functionals of the form t ∫0Tt P(X(s))ds, in the case where P is any given polynomial function. It extends a study initiated in Tran (2018), where only the quadratic case P(x)=x2 and the convergence in the sense of finite-dimensional distributions were considered.