Publication year
2018Source
Studia Mathematica, 241, 2, (2018), pp. 173-199ISSN
Publication type
Article / Letter to editor
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Organization
Medical Imaging
Journal title
Studia Mathematica
Volume
vol. 241
Issue
iss. 2
Page start
p. 173
Page end
p. 199
Subject
Radboudumc 9: Rare cancers RIHS: Radboud Institute for Health Sciences; Medical Imaging - Radboud University Medical CenterAbstract
We re-examine the theory of systems with quasi-discrete spectrum initiated in the 1960's by Abramov, Hahn, and Parry. In the first part, we give a simpler proof of the Hahn Parry theorem stating that each minimal topological system with quasi discrete spectrum is isomorphic to a certain affine automorphism system on some compact Abelian group. Next, we show that a suitable application of Gelfand's theorem renders Abramov's theorem-the analogue of the Hahn-Parry theorem for measure-preserving systems-a straightforward corollary of the Hahn-Parry result. In the second part, independent of the first, we present a shortened proof of the fact that each factor of a totally ergodic system with quasi-discrete spectrum (a "QDS-system") again has quasi-discrete spectrum and that such systems have zero entropy. Moreover, we obtain a complete algebraic classification of the factors of a QDS-system. In the third part, we apply the results of the second to the (still open) question whether a Markov quasi-factor of a QDS-system is already a factor of it. We show that this is true when the system satisfies some algebraic constraint on the group of quasi-eigenvalues, which is satisfied, e.g., in the case of the skew shift.
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- Faculty of Medical Sciences [94202]
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