Topology of Infinite-Dimensional Manifolds

An infinite-dimensional manifold is a topological manifold modeled on some infinite-dimensional homogeneous space called a model space. In this book, the following spaces are considered model spaces: Hilbert space (or non-separable Hilbert spaces), the Hilbert cube, dense subspaces of Hilbert spaces being universal spaces for absolute Borel spaces, the direct limit of Euclidean spaces, and the direct limit of Hilbert cubes (which is homeomorphic to the dual of a separable infinite-dimensional Banach space with bounded weak-star topology).

This book is designed for graduate students to acquire knowledge of fundamental results on infinite-dimensional manifolds and their characterizations. To read and understand this book, some background is required even for senior graduate students in topology, but that background knowledge is minimized and is listed in the first chapter so that references can easily be found. Almost all necessary background information is found in Geometric Aspects of General Topology, the author's first book.

Many kinds of hyperspaces and function spaces are investigated in various branches of mathematics, which are mostly infinite-dimensional. Among them, many examples of infinite-dimensional manifolds have been found. For researchers studying such objects, this book will be very helpful. As outstanding applications of Hilbert cube manifolds, the book contains proofs of the topological invariance of Whitehead torsion and Borsuk's conjecture on the homotopy type of compact ANRs. This is also the first book that presents combinatorial -manifolds, the infinite-dimensional version of combinatorial n-manifolds, and proofs of two remarkable results, that is, any triangulation of each manifold modeled on the direct limit of Euclidean spaces is a combinatorial -manifold and the Hauptvermutung for them is true.

Provides knowledge of fundamental results containing characterizations of various infinite-dimensional manifolds Contains details of most proofs so that graduate students in topology need to make only minimum reference to literature Presents combinatorial 8-manifolds with their characterization and a proof of the Hauptvermutung for them

Autorentext

Katsuro Sakai Associate Professor University of Tsukuba, Institute of Mathematics Academic Degrees Bachelor of Science-Nagoya University, March 1972 Master of Science-Tokyo University of Education, March 1974 Doctor of Science-University of Tsukuba, October 1979

Inhalt
Chapter 1: Preliminaries and Background Results.- Chapter 2: Fundamental Results on Infinite-Dimensional Manifolds.- Chapter 3: Characterizations of Hilbert Manifolds and Hilbert Cube Manifolds.- Chapter 4: Triangulation of Hilbert Cube Manifolds and Related Topics.- Chapter 5: Manifolds Modeled on Homotopy Dense Subspaces of Hilbert Spaces.- Chapter 6: Manifolds Modeled on Direct Limits and Combinatorial Manifold.- Appendex: PL n-Manifolds and Combinatorial n-Manifolds.- Epilogue.- Bibliography.- Index.