Abstract
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.
Original language | American English |
---|---|
Journal | Topology and its Applications |
Volume | 150 |
DOIs | |
State | Published - May 14 2005 |
Keywords
- Finite tail property
- Fractal
- Infinite replication property
- Iterated function system
- Lévy dragon
- Self-similar tile
- Tiling
- Topological disk
DC Disciplines
- Education
- Mathematics