Mathematics Books Topology BooksGeometric Topology Books

Surgery and Geometric Topology

Surgery and Geometric Topology

Surgery and Geometric Topology

This book covers the following topics: Cohomology and Euler Characteristics Of Coxeter Groups, Completions Of Stratified Ends, The Braid Structure Of Mapping Class Groups, Controlled Topological Equivalence Of Maps in The Theory Of Stratified Spaces and Approximate Fibrations, The Asymptotic Method In The Novikov Conjecture, N Exponentially Nash G Manifolds and Vector Bundles, Controlled Algebra and Topology.

Author(s):

s162 Pages
Similar Books
Surgery and Geometric Topology

Surgery and Geometric Topology

This book covers the following topics: Cohomology and Euler Characteristics Of Coxeter Groups, Completions Of Stratified Ends, The Braid Structure Of Mapping Class Groups, Controlled Topological Equivalence Of Maps in The Theory Of Stratified Spaces and Approximate Fibrations, The Asymptotic Method In The Novikov Conjecture, N Exponentially Nash G Manifolds and Vector Bundles, Controlled Algebra and Topology.

s162 Pages
Topics in Geometric Topology

Topics in Geometric Topology

This note covers some topics related to the classification of manifolds. The emphasis will be on manifolds of low dimension and cases where it is possible to obtain very precise information.

sNA Pages
History of               Knot Theory

History of Knot Theory

Currently this section contains no detailed description for the page, will update this page soon.

sNA Pages
Algebraic L theory and     Topological Manifolds [PDF 363p]

Algebraic L theory and Topological Manifolds [PDF 363p]

The book is divided into two parts, called Algebra and Topology. In principle, it is possible to start with the Introduction, and go on to the topology in Part II, referring back to Part I for novel algebraic concepts.

s363 Pages
The Geometry and Topology of     Three Manifolds by William P. Thurston

The Geometry and Topology of Three Manifolds by William P. Thurston

The intent of this lecture note is to describe the very strong connection between geometry and lowdimensional topology in a way which will be useful and accessible to graduate students and mathematicians working in related fields, particularly 3-manifolds and Kleinian groups.

sNA Pages
Geometric Topology     Localization, Periodicity, and Galois Symmetry (PDF 296p)

Geometric Topology Localization, Periodicity, and Galois Symmetry (PDF 296p)

This book explains the following topics: Algebraic Constructions, Homotopy Theoretical, Localization, Completions in Homotopy Theory, Spherical Fibrations, Algebraic Geometry and the Galois Group in Geometric Topology.

s296 Pages