Standard

Classification of the group actions on the real line and circle. / Malyutin, A. V.

In: St. Petersburg Mathematical Journal, Vol. 19, No. 2, 01.01.2008, p. 279-296.

Research output: Contribution to journalArticlepeer-review

Harvard

APA

Vancouver

Author

Malyutin, A. V. / Classification of the group actions on the real line and circle. In: St. Petersburg Mathematical Journal. 2008 ; Vol. 19, No. 2. pp. 279-296.

BibTeX

@article{2e0f657224954eca828911d16e351ac6,
title = "Classification of the group actions on the real line and circle",
abstract = "The group actions on the real line and circle are classified. It is proved that each minimal continuous action of a group on the circle is either a conjugate of an isometric action, or a finite cover of a proximal action. It is also shown that each minimal continuous action of a group on the real line either is conjugate to an isometric action, or is a proximal action, or is a cover of a proximal action on the circle. As a corollary, it is proved that a continuous action of a group on the circle either has a finite orbit, or is semiconjugate to a minimal action on the circle that is either isometric or proximal. As a consequence, a new proof of the Ghys–Margulis alternative is obtained.",
keywords = "Action, Circle, Distal, Group of homeomorphisms, Line, Proximal, Semiconjugacy",
author = "Malyutin, {A. V.}",
year = "2008",
month = jan,
day = "1",
doi = "10.1090/S1061-0022-08-00999-0",
language = "русский",
volume = "19",
pages = "279--296",
journal = "St. Petersburg Mathematical Journal",
issn = "1061-0022",
publisher = "American Mathematical Society",
number = "2",

}

RIS

TY - JOUR

T1 - Classification of the group actions on the real line and circle

AU - Malyutin, A. V.

PY - 2008/1/1

Y1 - 2008/1/1

N2 - The group actions on the real line and circle are classified. It is proved that each minimal continuous action of a group on the circle is either a conjugate of an isometric action, or a finite cover of a proximal action. It is also shown that each minimal continuous action of a group on the real line either is conjugate to an isometric action, or is a proximal action, or is a cover of a proximal action on the circle. As a corollary, it is proved that a continuous action of a group on the circle either has a finite orbit, or is semiconjugate to a minimal action on the circle that is either isometric or proximal. As a consequence, a new proof of the Ghys–Margulis alternative is obtained.

AB - The group actions on the real line and circle are classified. It is proved that each minimal continuous action of a group on the circle is either a conjugate of an isometric action, or a finite cover of a proximal action. It is also shown that each minimal continuous action of a group on the real line either is conjugate to an isometric action, or is a proximal action, or is a cover of a proximal action on the circle. As a corollary, it is proved that a continuous action of a group on the circle either has a finite orbit, or is semiconjugate to a minimal action on the circle that is either isometric or proximal. As a consequence, a new proof of the Ghys–Margulis alternative is obtained.

KW - Action

KW - Circle

KW - Distal

KW - Group of homeomorphisms

KW - Line

KW - Proximal

KW - Semiconjugacy

UR - http://www.scopus.com/inward/record.url?scp=85009776486&partnerID=8YFLogxK

U2 - 10.1090/S1061-0022-08-00999-0

DO - 10.1090/S1061-0022-08-00999-0

M3 - статья

AN - SCOPUS:85009776486

VL - 19

SP - 279

EP - 296

JO - St. Petersburg Mathematical Journal

JF - St. Petersburg Mathematical Journal

SN - 1061-0022

IS - 2

ER -

ID: 47487433