AbstractLet C ⊂ R be a compact totally disconnected subset of the real line R and [0, 1] ⊂ R, the closed unit interval. In this paper we prove that all topological embeddings of C × [0, 1] into R2 are tame; that is, there exists an ambient homeomorphism which straightens and makes parallel all arc components. It follows that no positive entropy map of C × [0, 1] (which covers a homeomorphism of C) can be “embedded” into a near homeomorphism of R2
AbstractIn this paper we develop unifying graph theoretic techniques to study the dynamics and the s...
On the LC1-spaces which are Cantor or arcwise homogeneous by H. Patkowska (Warszawa) Abstract. A spa...
AbstractFor n≥2, every n-dimensional compact manifold X admits a chaotic homeomorphism. The set of a...
If Lambda is a nondegenerate planar continuum and f : Gamma --> Gamma is a homeomorphism which is...
We prove that a positive entropy map of the product of a Cantor Set and an arc (which covers a homeo...
AbstractIn this paper we construct a family of circle-like continua, each admitting a finest monoton...
Graduation date: 1965The Cantor set is a compact, totally disconnected, perfect\ud subset of the rea...
Let K be a closed subset of a smooth manifold M, and let f: K! K be a continuous self-map of K. We s...
Abstract. It is shown that if X is a chainable continuum and h: X − → X is a homeomorphism such that...
Abstract. An arc-like continuum X is constructed with the following properties: (1) for every ∈ [0...
Abstract. A chainable continuum X is constructed with the following properties: (1) for every ∈ [0...
In this survey, we consider several questions pertaining to homeomorphisms, including criteria for t...
In [3] Knaster and Reichbach proved that any homeo morphism defined on a closed subset P of the Cant...
We introduce a topological object, called hairy Cantor set, which in many ways enjoys the universal ...
AbstractGlasner and Weiss have shown that a generic homeomorphism of the Cantor space has zero topol...
AbstractIn this paper we develop unifying graph theoretic techniques to study the dynamics and the s...
On the LC1-spaces which are Cantor or arcwise homogeneous by H. Patkowska (Warszawa) Abstract. A spa...
AbstractFor n≥2, every n-dimensional compact manifold X admits a chaotic homeomorphism. The set of a...
If Lambda is a nondegenerate planar continuum and f : Gamma --> Gamma is a homeomorphism which is...
We prove that a positive entropy map of the product of a Cantor Set and an arc (which covers a homeo...
AbstractIn this paper we construct a family of circle-like continua, each admitting a finest monoton...
Graduation date: 1965The Cantor set is a compact, totally disconnected, perfect\ud subset of the rea...
Let K be a closed subset of a smooth manifold M, and let f: K! K be a continuous self-map of K. We s...
Abstract. It is shown that if X is a chainable continuum and h: X − → X is a homeomorphism such that...
Abstract. An arc-like continuum X is constructed with the following properties: (1) for every ∈ [0...
Abstract. A chainable continuum X is constructed with the following properties: (1) for every ∈ [0...
In this survey, we consider several questions pertaining to homeomorphisms, including criteria for t...
In [3] Knaster and Reichbach proved that any homeo morphism defined on a closed subset P of the Cant...
We introduce a topological object, called hairy Cantor set, which in many ways enjoys the universal ...
AbstractGlasner and Weiss have shown that a generic homeomorphism of the Cantor space has zero topol...
AbstractIn this paper we develop unifying graph theoretic techniques to study the dynamics and the s...
On the LC1-spaces which are Cantor or arcwise homogeneous by H. Patkowska (Warszawa) Abstract. A spa...
AbstractFor n≥2, every n-dimensional compact manifold X admits a chaotic homeomorphism. The set of a...
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