We define a self-similar set as the (unique) invariant set of an iterated function system of certain contracting affine functions. A topology on them is obtained (essentially) by inducing the C 1- topology of the function space. We prove that the measure function is upper semi-continuous and give examples of discontinuities. We also show that the dimension is not upper semicontinuous. We exhibit a class of examples of self-similar sets of positive measure containing an open set. If C 1 and C 2 are two self-similar sets C 1 and C 2 such that the sum of their dimensions d(C 1)+d(C 2) is greater than one, it is known that the measure of the intersection set C 2−C 1 has positive measure for almost all self-similar sets. We prove that there are ...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
AbstractThe self-similar vector-valued measure is a vector analogue of the self-similar measure. In ...
It is known that, unlike the Hausdorff dimension, the Assouad dimension of a self-similar set can ex...
AbstractLet C be the triadic Cantor set. We characterize the all real number α such that the interse...
A contractive similarity is a function which preserves the geometry of a object but shrinks it down ...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
Abstract. For a very simple family of self-similar sets with two pieces we prove, using a technique ...
Given λ∈(0,1), let Eλ be the self-similar set generated by the iterated function system (IFS) {x/3,(...
Abstract. The structure of a self-similar set with open set condition does not change under magnific...
In this paper we consider self-similar Cantor sets ae R which are either homogeneous and \Gamma is...
Abstract. In this paper, we study the following question raised by Mattila in 1998: what are the sel...
In this paper we consider an one-parameter family of iterated function systems. For every value of t...
AbstractFor the contracting similaritiesS1(x)=x/3,S2(x)=(x+λ)/3, andS3(x)=(x+2)/3, where λ∈[0,1], le...
It is known that if the underlying iterated function system satisfies the open set condition, then t...
Historically, the Assouad dimension has been important in the study of quasi-conformal map-pings and...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
AbstractThe self-similar vector-valued measure is a vector analogue of the self-similar measure. In ...
It is known that, unlike the Hausdorff dimension, the Assouad dimension of a self-similar set can ex...
AbstractLet C be the triadic Cantor set. We characterize the all real number α such that the interse...
A contractive similarity is a function which preserves the geometry of a object but shrinks it down ...
The problem on intersection of Cantor sets was examined in many papers. To solve this problem, we in...
Abstract. For a very simple family of self-similar sets with two pieces we prove, using a technique ...
Given λ∈(0,1), let Eλ be the self-similar set generated by the iterated function system (IFS) {x/3,(...
Abstract. The structure of a self-similar set with open set condition does not change under magnific...
In this paper we consider self-similar Cantor sets ae R which are either homogeneous and \Gamma is...
Abstract. In this paper, we study the following question raised by Mattila in 1998: what are the sel...
In this paper we consider an one-parameter family of iterated function systems. For every value of t...
AbstractFor the contracting similaritiesS1(x)=x/3,S2(x)=(x+λ)/3, andS3(x)=(x+2)/3, where λ∈[0,1], le...
It is known that if the underlying iterated function system satisfies the open set condition, then t...
Historically, the Assouad dimension has been important in the study of quasi-conformal map-pings and...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
AbstractThe self-similar vector-valued measure is a vector analogue of the self-similar measure. In ...
It is known that, unlike the Hausdorff dimension, the Assouad dimension of a self-similar set can ex...