Smooth actions of finite Oliver groups on spheres

In this article, we deal with the following two questions. For smooth actions of a given finite group G on spheres S, which smooth manifolds F occur as the fixed point sets in S, and which real G-vector bundles ν over F occur as the equivariant normal bundles of F in S? We focus on the case G is an...

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Bibliographic Details
Published inTopology (Oxford) Vol. 42; no. 2; pp. 395 - 421
Main Authors Morimoto, Masaharu, Pawałowski, Krzysztof
Format Journal Article
LanguageEnglish
Published Elsevier Ltd 01.03.2003
Subjects
Equivariant bundle extension
Equivariant bundle subtraction
Equivariant normal bundle
Equivariant surgery
Equivariant thickening
Fixed point set
Gap group
Oliver group
Oliver obstruction
Smooth action on sphere
Oliver obstruction
Equivariant thickening
Equivariant bundle extension
Fixed point set
Equivariant bundle subtraction
Oliver group
Equivariant surgery
55R50
57R65
55M35
Smooth action on sphere
55R91
55R35
57S25
57S17
57R67
Equivariant normal bundle
Gap group
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Summary:In this article, we deal with the following two questions. For smooth actions of a given finite group G on spheres S, which smooth manifolds F occur as the fixed point sets in S, and which real G-vector bundles ν over F occur as the equivariant normal bundles of F in S? We focus on the case G is an Oliver group and answer both questions under some conditions imposed on G, F, and ν. We construct smooth actions of G on spheres by making use of equivariant surgery, equivariant thickening, and Oliver's equivariant bundle extension method modified by an equivariant wegde sum construction and an equivariant bundle subtraction procedure.
ISSN:0040-9383
1879-3215
DOI:10.1016/S0040-9383(02)00008-3