Publicado por Springer, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
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Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
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Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
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Publicado por Birkhauser 10/24/2012, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: BargainBookStores, Grand Rapids, MI, Estados Unidos de America
Paperback or Softback. Condición: New. Torsions of 3-Dimensional Manifolds 0.67. Book.
Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: Ria Christie Collections, Uxbridge, Reino Unido
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Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
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Publicado por Birkhäuser Basel, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: AHA-BUCH GmbH, Einbeck, Alemania
Taschenbuch. Condición: Neu. Druck auf Anfrage Neuware - Printed after ordering - Three-dimensional topology includes two vast domains: the study of geometric structures on 3-manifolds and the study of topological invariants of 3-manifolds, knots, etc. This book belongs to the second domain. We shall study an invariant called the maximal abelian torsion and denoted T. It is defined for a compact smooth (or piecewise-linear) manifold of any dimension and, more generally, for an arbitrary finite CW-complex X. The torsion T(X) is an element of a certain extension of the group ring Z[Hl(X)]. The torsion T can be naturally considered in the framework of simple homotopy theory. In particular, it is invariant under simple homotopy equivalences and can distinguish homotopy equivalent but non homeomorphic CW-spaces and manifolds, for instance, lens spaces. The torsion T can be used also to distinguish orientations and so-called Euler structures. Our interest in the torsion T is due to a particular role which it plays in three-dimensional topology. First of all, it is intimately related to a number of fundamental topological invariants of 3-manifolds. The torsion T(M) of a closed oriented 3-manifold M dominates (determines) the first elementary ideal of 7fl (M) and the Alexander polynomial of 7fl (M). The torsion T(M) is closely related to the cohomology rings of M with coefficients in Z and ZjrZ (r ;::: 2). It is also related to the linking form on Tors Hi (M), to the Massey products in the cohomology of M, and to the Thurston norm on H2(M).
Publicado por Birkhäuser Basel, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: moluna, Greven, Alemania
Condición: New.
Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: Books Unplugged, Amherst, NY, Estados Unidos de America
Condición: New. Buy with confidence! Book is in new, never-used condition 0.87.
Publicado por Birkhauser 2012-10, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: Chiron Media, Wallingford, Reino Unido
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Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
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Publicado por Springer, Basel, Birkhäuser Basel, Birkhäuser Okt 2012, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: BuchWeltWeit Ludwig Meier e.K., Bergisch Gladbach, Alemania
Taschenbuch. Condición: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -Three-dimensional topology includes two vast domains: the study of geometric structures on 3-manifolds and the study of topological invariants of 3-manifolds, knots, etc. This book belongs to the second domain. We shall study an invariant called the maximal abelian torsion and denoted T. It is defined for a compact smooth (or piecewise-linear) manifold of any dimension and, more generally, for an arbitrary finite CW-complex X. The torsion T(X) is an element of a certain extension of the group ring Z[Hl(X)]. The torsion T can be naturally considered in the framework of simple homotopy theory. In particular, it is invariant under simple homotopy equivalences and can distinguish homotopy equivalent but non homeomorphic CW-spaces and manifolds, for instance, lens spaces. The torsion T can be used also to distinguish orientations and so-called Euler structures. Our interest in the torsion T is due to a particular role which it plays in three-dimensional topology. First of all, it is intimately related to a number of fundamental topological invariants of 3-manifolds. The torsion T(M) of a closed oriented 3-manifold M dominates (determines) the first elementary ideal of 7fl (M) and the Alexander polynomial of 7fl (M). The torsion T(M) is closely related to the cohomology rings of M with coefficients in Z and ZjrZ (r ;::: 2). It is also related to the linking form on Tors Hi (M), to the Massey products in the cohomology of M, and to the Thurston norm on H2(M). 196 pp. Englisch.
Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: Mispah books, Redhill, SURRE, Reino Unido
Paperback. Condición: Like New. Like New. book.
Publicado por Birkhäuser, 2012
ISBN 10: 3034893981 ISBN 13: 9783034893985
Librería: GreatBookPrices, Columbia, MD, Estados Unidos de America
Condición: As New. Unread book in perfect condition.