In this work, by virtue of the properties of weakly almost periodic points of a dynamical system (X, T) with at least two points, the authors prove that, if the measure center M(T) of T is the whole space, that is...In this work, by virtue of the properties of weakly almost periodic points of a dynamical system (X, T) with at least two points, the authors prove that, if the measure center M(T) of T is the whole space, that is, M(T) = X, then the following statements are equivalent: (1) (X, T) is ergodic mixing; (2) (X, T) is topologically double ergodic; (3) (X, T) is weak mixing; (4) (X, T) is extremely scattering; (5) (X, T) is strong scattering; (6) (X × X, T × T) is strong scattering; (7) (X × X, T × T) is extremely scattering; (8) For any subset S of N with upper density 1, there is a c-dense Fα-chaotic set with respect to S. As an application, the authors show that, for the sub-shift aA of finite type determined by a k × k-(0, 1) matrix A, erA is strong mixing if and only if aA is totally transitive.展开更多
A topological dynamical system(X,f)is said to be multi-transitive if for every n∈N the system(Xn,f×f2××fn)is transitive.We introduce the concept of multi-transitivity with respect to a vector and show ...A topological dynamical system(X,f)is said to be multi-transitive if for every n∈N the system(Xn,f×f2××fn)is transitive.We introduce the concept of multi-transitivity with respect to a vector and show that multi-transitivity can be characterized by the hitting time sets of open sets,answering a question proposed by Kwietniak and Oprocha(2012).We also show that multi-transitive systems are Li-Yorke chaotic.展开更多
基金supported by the National Natural Science Foundation of China (No. 10971236)the Foundation of Jiangxi Provincial Education Department (No. GJJ11295)the Jiangxi Provincial Natural Science Foundation of China (No. 20114BAB201006)
文摘In this work, by virtue of the properties of weakly almost periodic points of a dynamical system (X, T) with at least two points, the authors prove that, if the measure center M(T) of T is the whole space, that is, M(T) = X, then the following statements are equivalent: (1) (X, T) is ergodic mixing; (2) (X, T) is topologically double ergodic; (3) (X, T) is weak mixing; (4) (X, T) is extremely scattering; (5) (X, T) is strong scattering; (6) (X × X, T × T) is strong scattering; (7) (X × X, T × T) is extremely scattering; (8) For any subset S of N with upper density 1, there is a c-dense Fα-chaotic set with respect to S. As an application, the authors show that, for the sub-shift aA of finite type determined by a k × k-(0, 1) matrix A, erA is strong mixing if and only if aA is totally transitive.
基金supported by National Natural Science Foundation of China(Grant Nos.11071084,11071231,11326135 and 11171320)Shantou University Scientific Research Foundation for Talents(Grant No.NTF12021)
文摘A topological dynamical system(X,f)is said to be multi-transitive if for every n∈N the system(Xn,f×f2××fn)is transitive.We introduce the concept of multi-transitivity with respect to a vector and show that multi-transitivity can be characterized by the hitting time sets of open sets,answering a question proposed by Kwietniak and Oprocha(2012).We also show that multi-transitive systems are Li-Yorke chaotic.
