Topological Methods in Group Theory [electronic resource] / by Ross Geoghegan.
Tipo de material:
TextoSeries Graduate Texts in Mathematics, 243Editor: New York, NY : Springer New York, 2008Descripción: online resourceTipo de contenido: text Tipo de medio: computer Tipo de portador: online resourceISBN: 9780387746142Trabajos contenidos: SpringerLink (Online service)Tema(s): Mathematics | Group theory | Topological Groups | Topology | Mathematics | Topological Groups, Lie Groups | Group Theory and Generalizations | TopologyFormatos físicos adicionales: Sin títuloClasificación CDD: 512.55 | 512.482 Clasificación LoC:QA252.3QA387Recursos en línea: de clik aquí para ver el libro electrónico Algebraic Topology for Group Theory -- CW Complexes and Homotopy -- Cellular Homology -- Fundamental Group and Tietze Transformation -- Some Techniques in Homotopy Theory -- Elementary Geometric Topology -- Finiteness Properties of Groups -- The Borel Construction and Bass-Serre Theory -- Topological Finiteness Properties and Dimension of Groups -- Homological Finiteness Properties of Groups -- Finiteness Properties of Some Important Groups -- Locally Finite Algebraic Topology for Group Theory -- Locally Finite CW Complexes and Proper Homotopy -- Locally Finite Homology -- Cohomology of CW Complexes -- Topics in the Cohomology of Infinite Groups -- Cohomology of Groups and Ends of Covering Spaces -- Filtered Ends of Pairs of Groups -- PoincarȨ Duality in Manifolds and Groups -- Homotopical Group Theory -- The Fundamental Group At Infinity -- Higher homotopy theory of groups -- Three Essays -- Three Essays.
Topological Methods in Group Theory is about the interplay between algebraic topology and the theory of infinite discrete groups. The author has kept three kinds of readers in mind: graduate students who have had an introductory course in algebraic topology and who need a bridge from common knowledge to the current research literature in geometric, combinatorial and homological group theory; group theorists who would like to know more about the topological side of their subject but who have been too long away from topology; and manifold topologists, both high- and low-dimensional, since the book contains much basic material on proper homotopy and locally finite homology not easily found elsewhere. The book focuses on two main themes: 1. Topological Finiteness Properties of groups (generalizing the classical notions of "finitely generated" and "finitely presented"); 2. Asymptotic Aspects of Infinite Groups (generalizing the classical notion of "the number of ends of a group"). Illustrative examples treated in some detail include: Bass-Serre theory, Coxeter groups, Thompson groups, Whitehead's contractible 3-manifold, Davis's exotic contractible manifolds in dimensions greater than three, the Bestvina-Brady Theorem, and the Bieri-Neumann-Strebel invariant. The book also includes a highly geometrical treatment of PoincarȨ duality (via cells and dual cells) to bring out the topological meaning of PoincarȨ duality groups. To keep the length reasonable and the focus clear, it is assumed that the reader knows or can easily learn the necessary algebra (which is clearly summarized) but wants to see the topology done in detail. Apart from the introductory material, most of the mathematics presented here has not appeared in book form before.
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