Bibliographic Information

Inverse spectra

A. Chigogidze

(North-Holland mathematical library, v. 53)

North-Holland Pub. Co. , Sole distributors for the U.S.A. and Canada, Elsevier Science Pub. Co., 1996

Available at  / 41 libraries

Search this Book/Journal

Note

Bibliography: p. 403-418

Includes index

Description and Table of Contents

Description

This is a comprehensive introduction into the method of inverse spectra - a powerful method successfully employed in various branches of topology.The notion of an inverse sequence and its limits, first appeared in the well-known memoir by Alexandrov where a special case of inverse spectra - the so-called projective spectra - were considered. The concept of an inverse spectrum in its present form was first introduced by Lefschetz. Meanwhile, Freudental, had introduced the notion of a morphism of inverse spectra. The foundations of the entire method of inverse spectra were laid down in these basic works.Subsequently, inverse spectra began to be widely studied and applied, not only in the various major branches of topology, but also in functional analysis and algebra. This is not surprising considering the categorical nature of inverse spectra and the extraordinary power of the related techniques.Updated surveys (including proofs of several statements) of the Hilbert cube and Hilbert space manifold theories are included in the book. Recent developments of the Menger and Noebeling manifold theories are also presented.This work significantly extends and updates the author's previously published book and has been completely rewritten in order to incorporate new developments in the field.

Table of Contents

Preface. Inverse Spectra. Preliminary information. Definitions and elementary properties of inverse spectra. Factorizing spectra and the spectral theorem. Infinite-Dimensional Manifolds. Absolute extensors and absolute retracts. Z-sets in AN R-spaces. R - and I -manifolds. Topology of R - and I -manifolds. Incomplete manifolds. Cohomological Dimension. Cohomological dimension. Cell-like mappings raising dimension. Universal space for cohomological dimension. Menger Manifolds. General theory. n-soft mappings of compacta, raising dimension. n-soft mappings of Polish spaces, raising dimension. Further properties of Menger manifolds. Homeomorphism groups. -soft map of onto . Noebeling Manifolds. Strongly A ,n-universal spaces. Pseudo-interiors and pseuod-boundaries of Menger compacta. Geometric pseudo-boundaries. Equivalence of categorical and geometric pseudo-interiors. Equivalence of the Noebeling space and the pseudo-interior of n. Further properties of Noebeling spaces. Open subspaces of Noebeling spaces. General Theory of Absolute Extensors in Dimension n and n-soft Mappings. AN E(n)-spaces and n-soft mappings. Morphisms of spectra and square diagrams. Spectral characterizations of n-soft mappings. Further properties of AE(0)-spaces. Strongly universal spaces. Topology of Non-Metrizable Manifolds. Non-metrizable manifolds. Topological characterization of I -manifolds. Topological characterization of R -manifolds. Trivial bundles. Applications. Uncountable powers of countable discrete spaces. Spectral representations of topological groups. Locally convex linear topological spaces. Shape properties of non-metrizable compacta. Fixed point sets of Tychonov cubes. Compact groups and fixed point sets. Group actions. Baire isomorphisms. Double spectra. Skeletoids in Tychonov cubes. Bibliography. Subject Index.

by "Nielsen BookData"

Related Books: 1-1 of 1

Details

  • NCID
    BA27948228
  • ISBN
    • 0444822259
  • Country Code
    ne
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Amsterdam ; New York ; Tokyo,New York, N.Y.
  • Pages/Volumes
    x, 421 p.
  • Size
    23 cm
  • Classification
  • Parent Bibliography ID
Page Top