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Seifert Fiberings
Kyung Bai Lee, University of Oklahoma, Norman, OK, and Frank Raymond, University of Michigan, Ann Arbor, MI

Mathematical Surveys and Monographs
2010; 396 pp; hardcover
Volume: 166
ISBN-10: 0-8218-5231-0
ISBN-13: 978-0-8218-5231-6
List Price: US$104
Member Price: US$83.20
Order Code: SURV/166
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See also:

Classifying Spaces of Sporadic Groups - David J Benson and Stephen D Smith

Seifert fiberings extend the notion of fiber bundle mappings by allowing some of the fibers to be singular. Away from the singular fibers, the fibering is an ordinary bundle with fiber a fixed homogeneous space. The singular fibers are quotients of this homogeneous space by distinguished groups of homeomorphisms. These fiberings are ubiquitous and important in mathematics. This book describes in a unified way their structure, how they arise, and how they are classified and used in applications. Manifolds possessing such fiber structures are discussed and range from the classical three-dimensional Seifert manifolds to higher dimensional analogues encompassing, for example, flat manifolds, infra-nil-manifolds, space forms, and their moduli spaces. The necessary tools not covered in basic graduate courses are treated in considerable detail. These include transformation groups, cohomology of groups, and needed Lie theory. Inclusion of the Bieberbach theorems, existence, uniqueness, and rigidity of Seifert fiberings, aspherical manifolds, symmetric spaces, toral rank of spherical space forms, equivariant cohomology, polynomial structures on solv-manifolds, fixed point theory, and other examples, exercises and applications attest to the breadth of these fiberings. This is the first time the scattered literature on singular fiberings is brought together in a unified approach. The new methods and tools employed should be valuable to researchers and students interested in geometry and topology.


Graduate students and research mathematicians interested in topology (transformation groups, manifolds, singular fiberings, and differential geometry).

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