Not much is known about the topological structure of a connected self-similar tile whose interior is disconnected, and even less is understood if the interior consists of infinitely many components. We introduce a technique to show that for a large class of self-similar tiles in ℝ2, the closure of each component of the interior is homeomorphic to a disk. This allows us to prove such a result for the Eisenstein set, the fundamental domain of a well-known quadratic canonical number system, and some other well-known fractal tiles
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
Self-similar sets are a class of fractals which can be rigorously defined and treated by mathematica...
International audienceCentral tiles are compact set with fractal boundary that are generated by beta...
We study the topological structure of connected self-similar tiles in R2 defined by injective contra...
AbstractWe study the topological structure of connected self-similar tiles in R2 defined by injectiv...
AbstractLet α=−2+−1 be a root of the polynomial p(x)=x2+4x+5. It is well known that the pair (p(x),{...
We show that the interiors of a large class of planar disklike self-similar tiles are quasidisks. We...
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...
AbstractThis paper studies topological and tiling properties of a family of self-affine fractal tile...
Self-similar sets with the open set condition, the linear objects of fractal geometry, have been con...
Abstract. In this paper, a technique for analyzing levels of hierarchy in a tiling T of Euclidean sp...
For a self-affine tile in R2 generated by an expanding matrix A∈M2(Z)and an integral consecutive col...
Die Arbeit untersucht die Geometrie selbstähnlicher Mengen endlichen Typs, indem die möglichen Nachb...
In this paper, we search for theoretical limitations of the Tile Assembly Model (TAM), along with te...
46 pages.International audienceIn this paper we study a class of countable and discrete subsets of a...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
Self-similar sets are a class of fractals which can be rigorously defined and treated by mathematica...
International audienceCentral tiles are compact set with fractal boundary that are generated by beta...
We study the topological structure of connected self-similar tiles in R2 defined by injective contra...
AbstractWe study the topological structure of connected self-similar tiles in R2 defined by injectiv...
AbstractLet α=−2+−1 be a root of the polynomial p(x)=x2+4x+5. It is well known that the pair (p(x),{...
We show that the interiors of a large class of planar disklike self-similar tiles are quasidisks. We...
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...
AbstractThis paper studies topological and tiling properties of a family of self-affine fractal tile...
Self-similar sets with the open set condition, the linear objects of fractal geometry, have been con...
Abstract. In this paper, a technique for analyzing levels of hierarchy in a tiling T of Euclidean sp...
For a self-affine tile in R2 generated by an expanding matrix A∈M2(Z)and an integral consecutive col...
Die Arbeit untersucht die Geometrie selbstähnlicher Mengen endlichen Typs, indem die möglichen Nachb...
In this paper, we search for theoretical limitations of the Tile Assembly Model (TAM), along with te...
46 pages.International audienceIn this paper we study a class of countable and discrete subsets of a...
AbstractLet K be a self-similar set in Rn which has similarity dimension n and nonempty interior. In...
Self-similar sets are a class of fractals which can be rigorously defined and treated by mathematica...
International audienceCentral tiles are compact set with fractal boundary that are generated by beta...