The Exact Hausdorff Measure of the Zero Set of Fractional Brownian Motion

Let {X(t), t∈ℝ N } be a fractional Brownian motion in ℝ d of index H. If L(0,I) is the local time of X at 0 on the interval I⊂ℝ N , then there exists a positive finite constant c(=c(N,d,H)) such that $$m_\phi\bigl(X^{-1}(0)\cap I\bigr)=cL(0,I),$$ where $\phi(t)=t^{N-dH}(\log\log\frac{1}{t})^{dH/N}$ , and m φ (E) is the Hausdorff φ-measure of E. This refines a previous result of Xiao (Probab. Theory Relat. Fields 109: 126–197, 1997) on the relationship between the local time and the Hausdorff measure of zero set for d-dimensional fractional Brownian motion on ℝ N .