Local behavior of local times of super Brownian motion
Abstract
For x∈ Rd- \0\, in dimension d=3, we study the asymptotic behavior of the local time Ltx of super-Brownian motion X starting from δ0 as x 0. Let (x)=((1/2π2) (1/|x|))1/2 be a normalization, Theorem 1 implies that (Ltx-(1/2π|x|))/(x) converges in distribution to a standard normal distributed random variable as x 0. For dimension d=2, Theorem 2 implies that Lxt-(1/π)(1/|x|) is L1 bounded as x 0. To do this, we prove a Tanaka formula for the local time which refines a result in Barlow, Evans and Perkins.
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