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Topological Properties of Spaces of Continuous Functions [electronic resource] / by Robert A. McCoy, Ibula Ntantu.

By: Contributor(s): Material type: TextTextSeries: Lecture Notes in Mathematics ; 1315Publisher: Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1988Description: VI, 130 p. online resourceContent type:
  • text
Media type:
  • computer
Carrier type:
  • online resource
ISBN:
  • 9783540391814
Subject(s): Additional physical formats: Printed edition:: No title; Printed edition:: No titleDDC classification:
  • 514 23
LOC classification:
  • QA611-614.97
Online resources:
Contents:
Function space topologies -- Natural functions -- Convergence and compact subsets -- Cardinal functions -- Completeness and other properties.
In: Springer eBooksSummary: This book brings together into a general setting various techniques in the study of the topological properties of spaces of continuous functions. The two major classes of function space topologies studied are the set-open topologies and the uniform topologies. Where appropriate, the analogous theorems for the two major classes of topologies are studied together, so that a comparison can be made. A chapter on cardinal functions puts characterizations of a number of topological properties of function spaces into a more general setting: some of these results are new, others are generalizations of known theorems. Excercises are included at the end of each chapter, covering other kinds of function space topologies. Thus the book should be appropriate for use in a classroom setting as well as for functional analysis and general topology. The only background needed is some basic knowledge of general topology.
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Function space topologies -- Natural functions -- Convergence and compact subsets -- Cardinal functions -- Completeness and other properties.

This book brings together into a general setting various techniques in the study of the topological properties of spaces of continuous functions. The two major classes of function space topologies studied are the set-open topologies and the uniform topologies. Where appropriate, the analogous theorems for the two major classes of topologies are studied together, so that a comparison can be made. A chapter on cardinal functions puts characterizations of a number of topological properties of function spaces into a more general setting: some of these results are new, others are generalizations of known theorems. Excercises are included at the end of each chapter, covering other kinds of function space topologies. Thus the book should be appropriate for use in a classroom setting as well as for functional analysis and general topology. The only background needed is some basic knowledge of general topology.

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