A contractive similarity is a function which preserves the geometry of a object but shrinks it down by some factor. If we have a finite collection of similarities, then there exists a unique compact set K which is the same set as the union of the the images of K under each similarity. This kind of K is called a self-similar set, which is a certain type of fractal. Self-similar sets may satisfy some separation conditions. These conditions describe how much the different similar parts of the self-similar set K may overlap each other. Self-similar sets with some separation condition, such as the open set condition, are understood quite well. However, without any separation conditions the self-similar set may be very complex. We prove that the...
We define deformed self-similar sets which are generated by a sequence of similar contraction mappin...
We define a self-similar set as the (unique) invariant set of an iterated function system of certain...
We introduce a technique that uses projection properties of fractal percolation to establish dimensi...
Let N be an integer with N >= 2 and let X be a compact subset of R-d. If S = (S-1, ..., S-N) is a...
We analyze the local bahaviour of the Hausdorff measure and the packing measure of self-similar sets...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
Self-similar measures can be obtained by regarding the self similar set generated by a system of sim...
We study self-similar sets with overlaps, on the line and in the plane. It is shown that there exist...
The properties of self-similar sets are discussed and a brief historical survey of ideas related to ...
AbstractThe dimension theory of self-similar sets is quite well understood in the cases when some se...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
We study the geometric properties of random multiplicative cascade measures defined on self-similar ...
AbstractWe prove that if a self-similar set E in Rn with Hausdorff dimension s satisfies the strong ...
Besicoviteh (1941) and Egglestone (1949) analyzed subsets of points of the unit interval with given...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
We define deformed self-similar sets which are generated by a sequence of similar contraction mappin...
We define a self-similar set as the (unique) invariant set of an iterated function system of certain...
We introduce a technique that uses projection properties of fractal percolation to establish dimensi...
Let N be an integer with N >= 2 and let X be a compact subset of R-d. If S = (S-1, ..., S-N) is a...
We analyze the local bahaviour of the Hausdorff measure and the packing measure of self-similar sets...
AbstractWe have given several necessary and sufficient conditions for statistically self-similar set...
Self-similar measures can be obtained by regarding the self similar set generated by a system of sim...
We study self-similar sets with overlaps, on the line and in the plane. It is shown that there exist...
The properties of self-similar sets are discussed and a brief historical survey of ideas related to ...
AbstractThe dimension theory of self-similar sets is quite well understood in the cases when some se...
AbstractWe define the notion of quasi self-similar measures and show that for such measures their ge...
We study the geometric properties of random multiplicative cascade measures defined on self-similar ...
AbstractWe prove that if a self-similar set E in Rn with Hausdorff dimension s satisfies the strong ...
Besicoviteh (1941) and Egglestone (1949) analyzed subsets of points of the unit interval with given...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
We define deformed self-similar sets which are generated by a sequence of similar contraction mappin...
We define a self-similar set as the (unique) invariant set of an iterated function system of certain...
We introduce a technique that uses projection properties of fractal percolation to establish dimensi...