Transformation Groups Book contents
- Frontmatter
- Contents
- PREFACE
- PART ONE
- Generators and relations for groups of homeomorphisms
- Affine embeddings of real Lie groups
- Equivariant differential operators of a Lie group
- Equivariant regular neighbourhoods
- Characteristic numbers and equivariant spin cobordism
- Equivariant K-theory and cyclic subgroups
- ℤ/p manifolds with low dimensional fixed point set
- Gaps in the relative degree of symmetry
- Characters do not lie
- Actions of Z/2n on S3
- Periodic homeomorphisms on non-compact 3 manifolds
- Equivariant function spaces and equivariant stable homotopy theory
- A property of a characteristic class of an orbit foliation
- Orbit structure for Lie group actions on higher cohomology projective spaces
- On the existence of group actions on certain manifolds
- PART TWO (SUMMARIES AND SURVEYS)
Actions of Z/2n on S3
Published online by Cambridge University Press: 05 March 2012
- Frontmatter
- Contents
- PREFACE
- PART ONE
- Generators and relations for groups of homeomorphisms
- Affine embeddings of real Lie groups
- Equivariant differential operators of a Lie group
- Equivariant regular neighbourhoods
- Characteristic numbers and equivariant spin cobordism
- Equivariant K-theory and cyclic subgroups
- ℤ/p manifolds with low dimensional fixed point set
- Gaps in the relative degree of symmetry
- Characters do not lie
- Actions of Z/2n on S3
- Periodic homeomorphisms on non-compact 3 manifolds
- Equivariant function spaces and equivariant stable homotopy theory
- A property of a characteristic class of an orbit foliation
- Orbit structure for Lie group actions on higher cohomology projective spaces
- On the existence of group actions on certain manifolds
- PART TWO (SUMMARIES AND SURVEYS)
Summary
ABSTRACT
This paper is devoted to classifying the actions of the cyclic group Z/2n on the 3-sphere S3. In particular, we show that if h ∈ Z/2n is a generator, then h is equivalent to a standard rotation of S3 if and only if h is a free action or has an almost tame fixed point set.
INTRODUCTION
The object of this paper is to classify all actions of the cyclic groups Z/2n on the 3-sphere S3. In section 2 we classify the non-free actions and in section 3 the free actions of Z/2n. In 1970, F. Waldhausen [19] has proven that every even periodic P.L. homeomorphism of S3 with 1-dimensional fixed point set is topologically equivalent to a standard rotation of S3. We shall extend Waldhausen's result by omitting the P.L. hypothesis and showing that every even periodic homeomorphism of S3 with non-empty fixed point set is topologically a standard rotation if and only if the set of fixed points is almost tame. In view of R. H. Bing's work [1] and [2], this is the strongest possible generalization of Waldhausen's result. This also settles the Smith conjecture [3] for homeomorphisms of period 2n whose fixed point sets are almost tame knots.
The problem of characterizing free cyclic actions on S3 remains largely unsolved. Thus far only free actions of Z/2 [6], Z/4 [11], and Z/8 [12] have been classified.
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- Transformation GroupsProceedings of the Conference in the University of Newcastle upon Tyne, August 1976, pp. 147 - 153Publisher: Cambridge University PressPrint publication year: 1977