Geometry of Minimal Flows (Draft)

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Title: Geometry of Minimal Flows (Draft)
Author: Basener, William
Abstract: Our main result is that a minimal flow on a compact manifold is either topologically conjugate to a Riemannian flow or every parametrization of φ is nowhere equicontinuous, defined as follows. A flow is Riemannian if given any points x, y ∈ M , the value of d(φt (x), φt (y)) is independent of t ∈ R . A flow is nowhere equicontinuous if there exists an
Description: To appear in Topology and its Applications.
Record URI: http://hdl.handle.net/1850/4741
Date: 2007-09-13

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