Litcius/Paper detail

On the multifractal analysis of measures in a probability space

Zhiming Li, Bilel Selmi

2021Illinois Journal of Mathematics20 citationsDOI

Abstract

In this paper, we calculate the relative multifractal Hausdorff and packing dimensions of measures in a probability space. Also, we obtain the analogue of Frostman’s lemma in a probability space for a relative multifractal Hausdorff measure. In the same way, there is a valid result for the relative multifractal packing pre-measure. Furthermore, we obtain the representations of the functions b and B by means of the analogue of Frostman’s lemma, and we provide a technique for showing that E is a (q,μ)-fractal with respect to ν. In addition, we suggest new proofs of theorems on the relative multifractal formalism in a probability space. They yield results even at a point q for which the multifractal functions b(q) and B(q) differ.

Topics & Concepts

Multifractal systemMathematicsProbability measureLemma (botany)Hausdorff spaceHausdorff measureMeasure (data warehouse)Mathematical proofOuter measureFractalCombinatoricsHausdorff dimensionPure mathematicsDiscrete mathematicsMathematical analysisMinkowski–Bouligand dimensionFractal dimensionGeometryBiologyComputer sciencePoaceaeDatabaseEcologyMathematical Dynamics and FractalsAdvanced Mathematical Theories and ApplicationsFunctional Equations Stability Results
On the multifractal analysis of measures in a probability space | Litcius