English

Inverse problems in multifractal analysis

Metric Geometry 2014-09-30 v3 Mathematical Physics math.MP Probability

Abstract

Multifractal formalism is designed to describe the distribution at small scales of the elements of Mc+(Rd)\mathcal M^+_c(\R^d), the set of positive, finite and compactly supported Borel measures on Rd\R^d. It is valid for such a measure μ\mu when its Hausdorff spectrum is the upper semi-continuous function given by the concave Legendre-Fenchel transform of the free energy function τμ\tau_\mu associated with μ\mu; this is the case for fundamental classes of exact dimensional measures. For any function τ\tau candidate to be the free energy function of some μMc+(Rd)\mu\in \mathcal M^+_c(\R^d), we build such a measure, exact dimensional, and obeying the multifractal formalism. This result is extended to a refined formalism considering jointly Hausdorff and packing spectra. Also, for any upper semi-continuous function candidate to be the lower Hausdorff spectrum of some exact dimensional μMc+(Rd)\mu\in\mathcal M^+_c(\R^d), we build such a measure. Our results transfer to the analoguous inverse problems in multifractal analysis of H\"older continuous functions.

Keywords

Cite

@article{arxiv.1311.3895,
  title  = {Inverse problems in multifractal analysis},
  author = {Julien Barral},
  journal= {arXiv preprint arXiv:1311.3895},
  year   = {2014}
}

Comments

60 pages; the part of this version dedicated to measures has been modified according to the version to be published (in Ann. Scient. Ec. Norm. Sup.)

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