Uniform dimension results for the inverse images of symmetric L\'evy processes
Abstract
We prove uniform Hausdorff and packing dimension results for the inverse images of a large class of real-valued symmetric L\'evy processes. Our main result for the Hausdorff dimension extends that of Kaufman (1985) for Brownian motion and that of Song, Xiao, and Yang (2018) for α-stable L\'evy processes with 1<α<2. Along the way, we also prove an upper bound for the uniform modulus of continuity of the local times of these processes.
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