Add to ORKGAbstract. A homeomorphism h: X − → X is expansive provided that for some fixed c> 0 and every x, y ∈ X there exists an integer n, dependent only on x and y, such that d(hn(x), hn(y))> c. It is shown that if X is a 1-dimensional continuum that separates the plane into 2 pieces, then h cannot be expansive. 1
In this paper, we show that the C1 interior of the set of all continuum-wise expansive diffeomorphis...
We give a new and elementary proof showing that a homeomorphism f:X →X of a compact metric space is ...
AbstractA homeomorphism f: X → X of a metric space X with metric d is expansive if there is c > 0 su...
AbstractA homeomorphism h:X→X is expansive provided that there exists a constant c>0 and for every x...
Abstract. A homeomorphism h: X → X is called expansive provided that for some fixed c> 0 and ever...
Abstract. A homeomorphism h : X → X is called expansive provided that for some fixed c > 0 and ev...
Abstract. A homeomorphism h: X → X is called expan-sive provided that for some fixed c> 0 and eve...
Abstract. A homeomorphism h: X − → X of a compactum X is expansive provided that for some fixed c>...
AbstractIn our previous paper, we introduced the notion of continuum-wise expansive homeomorphisms w...
AbstractIt is well known that if X is one of an arc, a circle or a disk, X does not admit an expansi...
AbstractIn this paper, we study expansive homeomorphisms from a point of view of continuum theory
AbstractA homeomorphism f:X→X of a compactum X with metric d is expansive if there is c>0 such that ...
We exploit the techniques developed in [Le] to study N-expansive homeomorphisms on surfaces. We prov...
We exploit the techniques developed in [Le] to study N-expansive homeomorphisms on surfaces. We prov...
Abstract. A collection {h1,...hn} of commutative homeomorphisms on X generate an expansive Zn action...
In this paper, we show that the C1 interior of the set of all continuum-wise expansive diffeomorphis...
We give a new and elementary proof showing that a homeomorphism f:X →X of a compact metric space is ...
AbstractA homeomorphism f: X → X of a metric space X with metric d is expansive if there is c > 0 su...
AbstractA homeomorphism h:X→X is expansive provided that there exists a constant c>0 and for every x...
Abstract. A homeomorphism h: X → X is called expansive provided that for some fixed c> 0 and ever...
Abstract. A homeomorphism h : X → X is called expansive provided that for some fixed c > 0 and ev...
Abstract. A homeomorphism h: X → X is called expan-sive provided that for some fixed c> 0 and eve...
Abstract. A homeomorphism h: X − → X of a compactum X is expansive provided that for some fixed c>...
AbstractIn our previous paper, we introduced the notion of continuum-wise expansive homeomorphisms w...
AbstractIt is well known that if X is one of an arc, a circle or a disk, X does not admit an expansi...
AbstractIn this paper, we study expansive homeomorphisms from a point of view of continuum theory
AbstractA homeomorphism f:X→X of a compactum X with metric d is expansive if there is c>0 such that ...
We exploit the techniques developed in [Le] to study N-expansive homeomorphisms on surfaces. We prov...
We exploit the techniques developed in [Le] to study N-expansive homeomorphisms on surfaces. We prov...
Abstract. A collection {h1,...hn} of commutative homeomorphisms on X generate an expansive Zn action...
In this paper, we show that the C1 interior of the set of all continuum-wise expansive diffeomorphis...
We give a new and elementary proof showing that a homeomorphism f:X →X of a compact metric space is ...
AbstractA homeomorphism f: X → X of a metric space X with metric d is expansive if there is c > 0 su...