We study the topological structure of connected self-similar tiles in R2 defined by injective contractions satisfying the open set condition. We emphasize on tiles each of whose interior consists of either finitely or infinitely many components. In the former case, we show in particular that the closure of some component is a topological disk. In the latter case we show that the closure of each component is a locally connected continuum. We introduce the finite tail and infinite replication properties and show that under these assumptions the closure of each component is a disk. As an application we prove that the closure of each component of the interior of the Lévy dragon is a disk
AbstractWe consider a class of planar self-affine tiles T that are generated by the lower triangular...
We set up a framework for computing the Hausdorff and box dimensions of the boundary of each compone...
Abstract. We study Minkowski contents and fractal curvatures of arbitrary self-similar tilings (cons...
AbstractWe study the topological structure of connected self-similar tiles in R2 defined by injectiv...
Not much is known about the topological structure of a connected self-similar tile whose interior is...
The set Vn of n-vertices of a tile T in \Rd is the common intersection of T with at least n of its n...
AbstractWe will obtain a new criterion for local connectivity of plane continua. With this criterion...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
We show that the interiors of a large class of planar disklike self-similar tiles are quasidisks. We...
AbstractLet α=−2+−1 be a root of the polynomial p(x)=x2+4x+5. It is well known that the pair (p(x),{...
Abstract. In this paper, a technique for analyzing levels of hierarchy in a tiling T of Euclidean sp...
We prove that the Heighway dragon is a countable union of closed geometrically similar disk-like pla...
International audienceCentral tiles are compact set with fractal boundary that are generated by beta...
Let P be a locally flnite disk pattern on the complex plane C whose combinatorics are described by t...
For a self-affine tile in R2 generated by an expanding matrix A∈M2(Z)and an integral consecutive col...
AbstractWe consider a class of planar self-affine tiles T that are generated by the lower triangular...
We set up a framework for computing the Hausdorff and box dimensions of the boundary of each compone...
Abstract. We study Minkowski contents and fractal curvatures of arbitrary self-similar tilings (cons...
AbstractWe study the topological structure of connected self-similar tiles in R2 defined by injectiv...
Not much is known about the topological structure of a connected self-similar tile whose interior is...
The set Vn of n-vertices of a tile T in \Rd is the common intersection of T with at least n of its n...
AbstractWe will obtain a new criterion for local connectivity of plane continua. With this criterion...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
We show that the interiors of a large class of planar disklike self-similar tiles are quasidisks. We...
AbstractLet α=−2+−1 be a root of the polynomial p(x)=x2+4x+5. It is well known that the pair (p(x),{...
Abstract. In this paper, a technique for analyzing levels of hierarchy in a tiling T of Euclidean sp...
We prove that the Heighway dragon is a countable union of closed geometrically similar disk-like pla...
International audienceCentral tiles are compact set with fractal boundary that are generated by beta...
Let P be a locally flnite disk pattern on the complex plane C whose combinatorics are described by t...
For a self-affine tile in R2 generated by an expanding matrix A∈M2(Z)and an integral consecutive col...
AbstractWe consider a class of planar self-affine tiles T that are generated by the lower triangular...
We set up a framework for computing the Hausdorff and box dimensions of the boundary of each compone...
Abstract. We study Minkowski contents and fractal curvatures of arbitrary self-similar tilings (cons...