Symmetric stochastic integrals with respect to a class of self-similar Gaussian processes

Abstract

We study the asymptotic behavior of the -symmetric Riemman sums for functionals of a self-similar centered Gaussian process X with increment exponent 0<α<1. We prove that, under mild assumptions on the covariance of X, the law of the weak -symmetric Riemman sums converge in the Skorohod topology when α=(2+1)-1, where denotes the smallest positive integer satisfying ∫01x2j(dx)=(2j+1)-1 for all j=0,…, -1. In the case α>(2+1)-1, we prove that the convergence holds in probability.