The thesis consists of four main chapters. The first chapter includes an introduction to inhomogeneous self-similar sets and measures. In particular, we show that these sets and measures are natural generalizations of the well known self-similar sets and measures. We then investigate the structure of these sets and measures. In the second chapter we study various fractal dimensions (Hausdorff, packing and box dimensions) of inhomogeneous self-similar sets and compare our results with the well-known results for (ordinary) self-similar sets. In the third chapter we investigate the L^{q} spectra and the Renyi dimensions of inhomogeneous self-similar measures and prove that new multifractal phenomena, not exhibited by (ordinary) self-sim...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
Journal PaperTo characterize the geometry of a measure, its so-called generalized dimensions D(<i>q<...
AbstractBy now the Lq-spectra of self-similar measures satisfying the so-called Open Set Condition i...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
We prove that non-uniform self-similar measures have a multifractal spectrum in a parameter domain w...
Let S-i : R-d -> R-d for i = 1,...,N be contracting similarities. Also, let (P-1, - - -, P-N, P) ...
AbstractThe self-similar vector-valued measure is a vector analogue of the self-similar measure. In ...
This paper investigates new properties concerning the multifractal structure of a class of statistic...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
Abstract. Sets that consist of finitely many smaller-scale copies of itself are known as self-simila...
AbstractIn this paper we obtain non-trivial bounds for the Lq-spectra of self-similar measures witho...
AbstractThe Lq-spectrum of a Borel measure is one of the key objects in multifractal analysis, and i...
Abstract. This thesis consists of two independent parts. Part I serves as an introduction to multifr...
AbstractFor any self-similar measure μ on Rd satisfying the weak separation condition, we show that ...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
Journal PaperTo characterize the geometry of a measure, its so-called generalized dimensions D(<i>q<...
AbstractBy now the Lq-spectra of self-similar measures satisfying the so-called Open Set Condition i...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
We prove that non-uniform self-similar measures have a multifractal spectrum in a parameter domain w...
Let S-i : R-d -> R-d for i = 1,...,N be contracting similarities. Also, let (P-1, - - -, P-N, P) ...
AbstractThe self-similar vector-valued measure is a vector analogue of the self-similar measure. In ...
This paper investigates new properties concerning the multifractal structure of a class of statistic...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
Abstract. Sets that consist of finitely many smaller-scale copies of itself are known as self-simila...
AbstractIn this paper we obtain non-trivial bounds for the Lq-spectra of self-similar measures witho...
AbstractThe Lq-spectrum of a Borel measure is one of the key objects in multifractal analysis, and i...
Abstract. This thesis consists of two independent parts. Part I serves as an introduction to multifr...
AbstractFor any self-similar measure μ on Rd satisfying the weak separation condition, we show that ...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
Journal PaperTo characterize the geometry of a measure, its so-called generalized dimensions D(<i>q<...