Asymptotic properties of the derivative of self-intersection local time of fractional Brownian motion

Abstract

Let \Bt\t≥0 be a fractional Brownian motion with Hurst parameter 23<H<1. We prove that the approximation of the derivative of self-intersection local time, defined as align* α &= ∫0T∫0tp'(Bt-Bs)dsdt, align* where p(x) is the heat kernel, satisfies a central limit theorem when renormalized by 32-1H. We prove as well that for q≥2, the q-th chaotic component of α converges in L2 when 23<H<34, and satisfies a central limit theorem when renormalized by a multiplicative factor 1-34H in the case 34<H<4q-34q-2.