A CLT for the third integrated moment of Brownian local time increments

Abstract

Let \Lxt ; (x,t)∈ R1× R1+\ denote the local time of Brownian motion. Our main result is to show that for each fixed t ∫ (Lx+ht- Lxt)3 dx-12h∫ (Lx+ht - Lxt)Lxt dx-24h2t h2 L192(∫ (Lxt)3dx)1/2η as h 0, where η is a normal random variable with mean zero and variance one that is independent of Lxt. This generalizes our previous result for the second moment. We also explain why our approach will not work for higher moments