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引用次数: 1
摘要
我们证明了对于每一个\ begin{document}$d≠3$\ end{document},都存在\ begin{document}$\mathbb{T}^{d}$\ end}的Anosov微分同胚,它是稳定的Krieger型\ begin \document}${\rm III}_1$\ end{document}(它的Maharam扩展是弱混合的)。这是通过构造一个稳定类型的关于黄金均值移动的\bbegin{document}${\rmIII}_1$\end{document}Markov测度来实现的,该测度可以通过我们先前的论文中的构造顺利地实现为\bbegin{document}$\mathbb{T}^2$\end{document}的\bbein{document}$C^{1}$\end}Anosov微分同胚性。
On manifolds admitting stable type III$_{\textbf1}$ Anosov diffeomorphisms
We prove that for every \begin{document}$d≠3$\end{document} there is an Anosov diffeomorphism of \begin{document}$\mathbb{T}^{d}$\end{document} which is of stable Krieger type \begin{document}${\rm III}_1$\end{document} (its Maharam extension is weakly mixing). This is done by a construction of stable type \begin{document}${\rm III}_1$\end{document} Markov measures on the golden mean shift which can be smoothly realized as a \begin{document}$C^{1}$\end{document} Anosov diffeomorphism of \begin{document}$\mathbb{T}^2$\end{document} via the construction in our earlier paper.
期刊介绍:
The Journal of Modern Dynamics (JMD) is dedicated to publishing research articles in active and promising areas in the theory of dynamical systems with particular emphasis on the mutual interaction between dynamics and other major areas of mathematical research, including:
Number theory
Symplectic geometry
Differential geometry
Rigidity
Quantum chaos
Teichmüller theory
Geometric group theory
Harmonic analysis on manifolds.
The journal is published by the American Institute of Mathematical Sciences (AIMS) with the support of the Anatole Katok Center for Dynamical Systems and Geometry at the Pennsylvania State University.
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