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90a:57025
57N20 (54C55)
van Mill, J.(NL-VUAM)
Infinite-dimensional topology.
Prerequisites and introduction.
North-Holland Mathematical Library, 43.
North-Holland Publishing Co., Amsterdam, 1989. xii+401 pp. \$73.25. ISBN 0-444-87133-0
The first six chapters of the book present a thorough
introduction to the background materials necessary for an extensive
excursion into the topology of infinite-dimensional manifolds
modeled on the Hilbert cube. The final two chapters
contain an exposition, as well as applications, of the topological
characterization of Hilbert
cube manifolds due to H. Torunczyk. The book assumes only a
familiarity with basic topological concepts (e.g., metric spaces,
complete metric spaces, compactness, connectedness, continuity,
product spaces). Chapter 2 is titled "Elementary plane topology"
and includes the Brouwer fixed point theorem for $I\sp 2$
and the Jordan curve
theorem. Chapter 3 is titled "Elementary combinatorial techniques"
and contains an introduction to the combinatorial structure of
Euclidean spaces, including "Sperner's lemma" and, in turn, the
Brouwer fixed point theorem for $I\sp n.$ Chapter 4 is an introduction
to dimension theory, Chapter 5 is an introduction to the theory of
absolute neighborhood retracts, and Chapter 6 is an introduction to
infinite-dimensional manifolds modeled on the Hilbert cube and
Hilbert space.
The book functions well as a text. Its proofs are self-contained and
there are a reasonable number of exercises. It also
serves as a
background source as each chapter ends with brief references to
original sources.
The author accurately states that "the first part of this book is intended
as a text for graduate courses in topology".
While a thorough introduction to infinite-dimensional topology is not
unexpected, given the title, the
materials on dimension theory and ANR theory are remarkably
extensive.
Reviewed by John J. Walsh
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