On real extensions of distal minimal homeomorphisms
classification
🧮 math.DS
keywords
distalextensionsminimalproductrealskewcertaincompact
read the original abstract
We prove a structure theorem for topologically conservative real skew product extensions of distal minimal compact metric $\Z$-flows. The main result states that every such extension can be represented by a perturbation of a Rokhlin skew product. Moreover, we give certain counterexamples to point out that all components of the construction are in fact inevitable.
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