On the projections of the multifractal packing dimension for q>1

Abstract

The aim of this article is to study the behaviour of the multifractal packing function Bμ(q) under projections in Euclidean space for q>1. We show that Bμ(q) is preserved under almost every orthogonal projection. As an application, we study the multifractal analysis of the projections of a measure. In particular, we obtain general results for the multifractal analysis of the orthogonal projections on m-dimensional linear subspaces of a measure μ satisfying the multifractal formalism.