AbstractLet μ be a locally positive Borel measure on a σ-compact n-manifold X,n≥2. We show that there is always a μ-preserving homeomorphism of X which is maximally chaotic in that it satisfies Devaney's definition of chaos, with the sensitivity constant chosen maximally. Furthermore, maximally chaotic homeomorphisms are compact-open topology dense in the space of all μ-preserving homeomorphisms of X if and only if (X,μ) has at most one end of infinite measure. (For example, for Lebesgue measure λ on X=R2, but not for λ on the strip X=R×[0,1].) This work extends that of Aarts and Daalderop, Daalderop and Fokkink, Kato et al., and Alpern, regarding chaotic phenomena on compact manifolds, and that of Besicovitch and Prasad for other dynamical...
Let M be a connected, finite dimensional, second countable manifold and let µo be a locally finite, ...
We prove that the homeomorphisms of a compact manifold with dimension one have zero topological emer...
Compact locally maximal hyperbolic sets are studied via geometrically defined functional spaces tha...
Let be a locally positive Borel measure on a -compact n-manifold X;n> 2. We show that there is a...
AbstractFor n≥2, every n-dimensional compact manifold X admits a chaotic homeomorphism. The set of a...
AbstractThe set of all chaotic measure-preserving homeomorphisms on a compact n-dimensional manifold...
AbstractIn this paper, we introduce a new notion of everywhere chaotic homeomorphism and we prove th...
AbstractGiven an integer n⩾2, a metrizable compact topological n-manifold X with boundary and a fini...
AbstractWe study nonatomic, locally positive, Lebesgue–Stieltjes measures on compact Menger manifold...
AbstractThe infimum respectively minimum of the topological entropies in different spaces are studie...
AbstractLet M be a compact manifold with dimM⩾2. We prove that some iteration of the generic homeomo...
AbstractLet f be a continuous map from a compact metric space X to itself. The map f is called to be...
We give a summary on the development of the relationships between some chaos characterizations, focu...
AbstractIn the class T of triangular maps of the square we consider the strongest notion of distribu...
$\tau$ is a continuous map on a metric compact space $X$. For a continuous function $\phi:X\to\math...
Let M be a connected, finite dimensional, second countable manifold and let µo be a locally finite, ...
We prove that the homeomorphisms of a compact manifold with dimension one have zero topological emer...
Compact locally maximal hyperbolic sets are studied via geometrically defined functional spaces tha...
Let be a locally positive Borel measure on a -compact n-manifold X;n> 2. We show that there is a...
AbstractFor n≥2, every n-dimensional compact manifold X admits a chaotic homeomorphism. The set of a...
AbstractThe set of all chaotic measure-preserving homeomorphisms on a compact n-dimensional manifold...
AbstractIn this paper, we introduce a new notion of everywhere chaotic homeomorphism and we prove th...
AbstractGiven an integer n⩾2, a metrizable compact topological n-manifold X with boundary and a fini...
AbstractWe study nonatomic, locally positive, Lebesgue–Stieltjes measures on compact Menger manifold...
AbstractThe infimum respectively minimum of the topological entropies in different spaces are studie...
AbstractLet M be a compact manifold with dimM⩾2. We prove that some iteration of the generic homeomo...
AbstractLet f be a continuous map from a compact metric space X to itself. The map f is called to be...
We give a summary on the development of the relationships between some chaos characterizations, focu...
AbstractIn the class T of triangular maps of the square we consider the strongest notion of distribu...
$\tau$ is a continuous map on a metric compact space $X$. For a continuous function $\phi:X\to\math...
Let M be a connected, finite dimensional, second countable manifold and let µo be a locally finite, ...
We prove that the homeomorphisms of a compact manifold with dimension one have zero topological emer...
Compact locally maximal hyperbolic sets are studied via geometrically defined functional spaces tha...