Hausdorff, Large Deviation and Legendre Multifractal Spectra of L\'evy Multistable Processes

Abstract

We compute the Hausdorff multifractal spectrum of two versions of multistable L\'evy motions. These processes extend classical L\'evy motion by letting the stability exponent α evolve in time. The spectra provide a decomposition of [0, 1] into an uncountable disjoint union of sets with Hausdorff dimension one. We also compute the increments-based large deviations multifractal spectrum of the independent in-crements multistable L\'evy motion. This spectrum turns out to be concave and thus coincides with the Legendre multifractal spectrum, but it is different from the Haus-dorff multifractal spectrum. The independent increments multistable L\'evy motion thus provides an example where the strong multifractal formalism does not hold.