Skew product dynamical systems, Ellis groups and topological centre

In this paper, a general construction of a skew product dynamical system, for which the skew product dynamical system studied by Hahn is a special case, is given. Then the ergodic and topological properties (of a special type) of our newly defined systems (called Milnes type systems) are investigated. It is shown that the Milnes type systems are actually natural extensions of dynamical systems corresponding to some special distal functions. Finally, the topological centre of the Ellis group of any skew product dynamical system is calculated.

💡 Research Summary

The paper develops a unified framework for skew‑product dynamical systems that subsumes the classical construction introduced by Hahn. The authors begin by fixing two topological groups, a base group (G) and a fibre (or “satellite”) group (H), and define a transformation
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