Abstract
Let X={X(t),t∈R+} be a dilation-stable Lévy process on Rd. We determine a Hausdorff measure function ϕ(a) such that the graph G[0,1]={(t,X(t)):0⩽t⩽1} has positive finite ϕ-measure. We also investigate the packing measure of G[0,1].
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