A CLT for the L2 modulus of continuity of Brownian local time

Abstract

Let \Lxt ; (x,t)∈ R1× R1+\ denote the local time of Brownian motion and \[ αt:=∫-∞∞ (Lxt)2 dx . \] Let η=N(0,1) be independent of αt. For each fixed t \[ ∫-∞∞ (Lx+ht- Lxt)2 dx- 4ht h3/2 L(64 3)1/2αt η, \] as h 0. Equivalently \[ ∫-∞∞ (Lx+1t- Lxt)2 dx- 4t t3/4 L(64 3 )1/2α1 η, \] as t∞.