Fixed points of abelian actions on S2

John Franks; Michael Handel; Kamlesh Parwani

Fixed points of abelian actions on S2

John Franks, Michael Handel, Kamlesh Parwani

Eastern Illinois University

Northwestern University

Research output: Contribution to journal › Article › peer-review

Abstract

We prove that if $F$ is a finitely generated abelian group of orientation preserving $C^1$ diffeomorphisms of $R^2$ which leaves invariant a compact set then there is a common fixed point for all elements of $F.$ We also show that if $F$ is any abelian subgroup of orientation preserving $C^1$ diffeomorphisms of $S^2$ then there is a common fixed point for all elements of a subgroup of $F$ with index at most two.

Original language	American English
Journal	Ergodic Theory and Dynamical Systems
Volume	27
State	Published - Oct 2007

Disciplines

Mathematics

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Cite this

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title = "Fixed points of abelian actions on S2",

abstract = " We prove that if \$F\$ is a finitely generated abelian group of orientation preserving \$C\textasciicircum{}1\$ diffeomorphisms of \$R\textasciicircum{}2\$ which leaves invariant a compact set then there is a common fixed point for all elements of \$F.\$ We also show that if \$F\$ is any abelian subgroup of orientation preserving \$C\textasciicircum{}1\$ diffeomorphisms of \$S\textasciicircum{}2\$ then there is a common fixed point for all elements of a subgroup of \$F\$ with index at most two.",

author = "John Franks and Michael Handel and Kamlesh Parwani",

year = "2007",

month = oct,

language = "American English",

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T1 - Fixed points of abelian actions on S2

AU - Franks, John

AU - Handel, Michael

AU - Parwani, Kamlesh

PY - 2007/10

Y1 - 2007/10

N2 - We prove that if $F$ is a finitely generated abelian group of orientation preserving $C^1$ diffeomorphisms of $R^2$ which leaves invariant a compact set then there is a common fixed point for all elements of $F.$ We also show that if $F$ is any abelian subgroup of orientation preserving $C^1$ diffeomorphisms of $S^2$ then there is a common fixed point for all elements of a subgroup of $F$ with index at most two.

AB - We prove that if $F$ is a finitely generated abelian group of orientation preserving $C^1$ diffeomorphisms of $R^2$ which leaves invariant a compact set then there is a common fixed point for all elements of $F.$ We also show that if $F$ is any abelian subgroup of orientation preserving $C^1$ diffeomorphisms of $S^2$ then there is a common fixed point for all elements of a subgroup of $F$ with index at most two.

M3 - Article

VL - 27

JO - Ergodic Theory and Dynamical Systems

JF - Ergodic Theory and Dynamical Systems

ER -