On the Topology of Isolated Singularities in Analytic Spaces [electronic resource] / by José Seade.
Contributor(s): SpringerLink (Online service)Material type: TextSeries: Progress in Mathematics: 241Publisher: Basel : Birkhäuser Basel, 2006Description: XIV, 238 p. online resourceContent type: text Media type: computer Carrier type: online resourceISBN: 9783764373955Subject(s): Mathematics | Topological groups | Lie groups | Functions of complex variables | Differential geometry | Algebraic topology | Mathematics | Functions of a Complex Variable | Topological Groups, Lie Groups | Differential Geometry | Algebraic TopologyAdditional physical formats: Printed edition:: No titleDDC classification: 515.9 LOC classification: QA331-355Online resources: Click here to access online
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A Fast Trip Through the Classical Theory -- Motions in Plane Geometry and the 3-dimensional Brieskorn Manifolds -- 3-dimensional Lie Groups and Surface Singularities -- Within the Realm of the General Index Theorem -- On the Geometry and Topology of Quadrics in ??n -- Real Singularities and Complex Geometry -- Real Singularities with a Milnor Fibration -- Real Singularities and Open Book Decompositions of the 3-sphere.
The aim of this book is to give an overview of selected topics on the topology of real and complex isolated singularities, with emphasis on its relations to other branches of geometry and topology. The first chapters are mostly devoted to complex singularities and a myriad of results spread in a vast literature, which are presented here in a unified way, accessible to non-specialists. Among the topics are the fibration theorems of Milnor; the relation with 3-dimensional Lie groups; exotic spheres; spin structures and 3-manifold invariants; the geometry of quadrics and Arnold's theorem which states that the complex projective plane modulo conjugation is the 4-sphere. The second part of the book studies pioneer work about real analytic singularities which arise from the topological and geometric study of holomorphic vector fields and foliations. In the low dimensional case these turn out to be related to fibred links in the 3-sphere defined by meromorphic functions. This provides new methods for constructing manifolds equipped with a rich geometry. The book is largely self-contained and serves a wide audience of graduate students, mathematicians and researchers interested in geometry and topology.