Functional limit theorem for the self-intersection local time of the fractional Brownian motion

Abstract

Let \Bt\t≥0 be a d-dimensional fractional Brownian motion with Hurst parameter 0<H<1, where d≥2. Consider the approximation of the self-intersection local time of B, defined as align* IT &=∫0T∫0tp(Bt-Bs)dsdt, align* where p(x) is the heat kernel. We prove that the process \IT-E[IT]\T≥0, rescaled by a suitable normalization, converges in law to a constant multiple of a standard Brownian motion for 32d<H≤34 and to a multiple of a sum of independent Hermite processes for 34<H<1, in the space C[0,∞), endowed with the topology of uniform convergence on compacts.