Treffer: Mixed spectrum reparameterizations of linear flows on \(\mathbb T^2\)
Title:
Mixed spectrum reparameterizations of linear flows on \(\mathbb T^2\)
Authors:
Publisher Information:
Independent University of Moscow, Moscow; American Mathematical Society (AMS), Providence, RI
Subject Terms:
Algebraic ergodic theory, cocycles, orbit equivalence, ergodic equivalence relations, cocycle, One-parameter continuous families of measure-preserving transformations, Dynamical systems involving smooth mappings and diffeomorphisms, Mixed spectrum, Relations of ergodic theory with number theory and harmonic analysis, special flow, Liouville, reparameterization
Document Type:
Fachzeitschrift
Article
File Description:
application/xml
Access URL:
Accession Number:
edsair.c2b0b933574d..5f5679f85bbab4de7a3f238a09944f0a
Database:
OpenAIRE
Weitere Informationen
Summary: We prove the existence of mixed spectrum \(C^{\infty}\) reparameterizations of any linear flow on \(\mathbb T^2\) with Liouville rotation number. For a restricted class of Liouville rotation numbers, we prove the existence of mixed spectrum real-analytic reparameterizations.