Limit Theorems for Additive Functionals of the Fractional Brownian Motion

Abstract

We investigate first and second order fluctuations of additive functionals of a fractional Brownian motion (fBm) of the form aligneq:abstractmain Zn=\∫0tf(nH(Bs-λ))ds\ ; t≥ 0 \ align where B=\Bt; t ≥ 0\ is a fBm with Hurst parameter H∈ (0,1), f is a suitable test function and λ∈ R. We develop our study by distinguishing two regimes which exhibit different behaviors. When H∈(0,1/3), we show that a suitable renormalization of Zn, compensated by a multiple of the local time of B, converges towards a constant multiple of the derivative of the local time of B. In contrast, in the case H∈[1/3,1) we show that Zn converges towards an independent Brownian motion subordinated to the local time of B. Our results refine and complement those from the current literature and solve at the same time the critical case H=1/3, which had remained open until now.