Classical multifractal analysis studies the local scaling behaviour of a single measure. However, recently mixed multifractal has generated interest. Mixed multifractal analysis studies the simultaneous scaling behaviour of finitely many measures and provides the basis for a significantly better understanding of the local geometry of fractal measures. The purpose of this paper is twofold. Firstly, we define and develop a general and unifying mixed multifractal theory of mixed Renyi dimensions (also sometimes called the generalized dimensions), mixed L-q-dimensions and mixed coarse multifractal spectra for arbitrary doubling measures. Secondly, as an application of the general theory developed in this paper, we provide a complete description...
The concept of dimension is an important task in geometry. It permits a description of the growth pr...
We prove that non-uniform self-similar measures have a multifractal spectrum in a parameter domain w...
This thesis explores the relationships between multifractal measures, multiplicative cascades and co...
Classical multifractal analysis studies the local scaling behaviour of a single measure. However, re...
AbstractClassical multifractal analysis studies the local scaling behaviour of a single measure. How...
Journal PaperTo characterize the geometry of a measure, its so-called generalized dimensions D(<i>q<...
AbstractTo characterize the geometry of a measure, its generalized dimensions dq have been introduce...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
Two of the main objects of study in multifractal analysis of measures are the coarse multifractal sp...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
In this paper we study the multifractal structure of a certain class of self-affine measures known a...
The purpose of this dissertation is to introduce a natural and unifying multifractal formalism which...
Abstract. This thesis consists of two independent parts. Part I serves as an introduction to multifr...
Visualization of sets in Euclidean space that possess notions of non-integer dimension has lead to a...
Journal PaperThere are strong reasons to believe that the multifractal spectrum of DLA shows anomali...
The concept of dimension is an important task in geometry. It permits a description of the growth pr...
We prove that non-uniform self-similar measures have a multifractal spectrum in a parameter domain w...
This thesis explores the relationships between multifractal measures, multiplicative cascades and co...
Classical multifractal analysis studies the local scaling behaviour of a single measure. However, re...
AbstractClassical multifractal analysis studies the local scaling behaviour of a single measure. How...
Journal PaperTo characterize the geometry of a measure, its so-called generalized dimensions D(<i>q<...
AbstractTo characterize the geometry of a measure, its generalized dimensions dq have been introduce...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
Two of the main objects of study in multifractal analysis of measures are the coarse multifractal sp...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
In this paper we study the multifractal structure of a certain class of self-affine measures known a...
The purpose of this dissertation is to introduce a natural and unifying multifractal formalism which...
Abstract. This thesis consists of two independent parts. Part I serves as an introduction to multifr...
Visualization of sets in Euclidean space that possess notions of non-integer dimension has lead to a...
Journal PaperThere are strong reasons to believe that the multifractal spectrum of DLA shows anomali...
The concept of dimension is an important task in geometry. It permits a description of the growth pr...
We prove that non-uniform self-similar measures have a multifractal spectrum in a parameter domain w...
This thesis explores the relationships between multifractal measures, multiplicative cascades and co...