Add to ORKGCopyright c © 2013 Tianxiu Lu et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. This paper is concerned with chaotic of maps on general metric spaces. It is proved that uniformly conjugation preserves Auslander-Yorke’s chaoticity, dense chaoticity, dense δ-chaoticity, distributional chaoticity, and distributional chaoticity in a sequence
If x and y belong to a metric space X , we call (x,y) a DC1 scrambled pair for f:X→X if the followi...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...
We characterize distributional chaos for linear operators on Fréchet spaces in terms of a computable...
We characterize distributional chaos for linear operators on Fréchet spaces in terms of a computable...
AbstractIn this paper we show that a continuous function on a compact metric space exhibits distribu...
The notion of distributional chaos was introduced by Schweizer and Smítal [Measures of chaos and a s...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
Abstract. In this paper we consider relations between chaos in the sense of Li and Yorke, and!-chaos...
Let (X, d) be a compact metric space, and (K(X),H) is d induced Hausdorff metric space of all non-em...
AbstractLet f be a continuous map from a compact metric space X to itself. The map f is called to be...
Rufus Bowen introduced the specification property for maps on a compact metric space. In this disser...
If x and y belong to a metric space X , we call (x,y) a DC1 scrambled pair for f:X→X if the followi...
If x and y belong to a metric space X , we call (x,y) a DC1 scrambled pair for f:X→X if the followi...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...
We characterize distributional chaos for linear operators on Fréchet spaces in terms of a computable...
We characterize distributional chaos for linear operators on Fréchet spaces in terms of a computable...
AbstractIn this paper we show that a continuous function on a compact metric space exhibits distribu...
The notion of distributional chaos was introduced by Schweizer and Smítal [Measures of chaos and a s...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
summary:Schweizer and Smítal introduced the distributional chaos for continuous maps of the interval...
Abstract. In this paper we consider relations between chaos in the sense of Li and Yorke, and!-chaos...
Let (X, d) be a compact metric space, and (K(X),H) is d induced Hausdorff metric space of all non-em...
AbstractLet f be a continuous map from a compact metric space X to itself. The map f is called to be...
Rufus Bowen introduced the specification property for maps on a compact metric space. In this disser...
If x and y belong to a metric space X , we call (x,y) a DC1 scrambled pair for f:X→X if the followi...
If x and y belong to a metric space X , we call (x,y) a DC1 scrambled pair for f:X→X if the followi...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...
LP-Conjugation, introduced by Padua and Libao, is a versatile method used in solving the Inverse Fro...