Since quasi-uniform spaces were defined in 1948, a diverse and widely dispersed literatureconcerning them has emerged. In Quasi-Uniform Spaces, the authors present a comprehensivestudy of these structures, together with the theory of quasi-proximities. In additionto new results unavailable elsewhere, the volume unites fundamental materialheretofore scattered throughout the literature.Quasi-Uniform Spaces shows by example that these structures provide a natural approachto the study of point-set topology. It is the only source for many results related to completeness,and a primary source for the study of both transitive and quasi-metric spaces.Included are H. Junnila's analogue of Tamano's theorem, J. Kofner's result showing thatevery GO space is transitive, and R. Fox's example of a non-quasi-metrizable r-space. Inaddition to numerous interesting problems mentioned throughout the text , 22 formalresearch problems are featured. The book nurtures a radically different viewpoint oftopology , leading to new insights into purely topological problems.Since every topological space admits a quasi-uniformity, the study of quasi-uniformspaces can be seen as no less general than the study of topological spaces. For such study,Quasi-Uniform Spaces is a necessary, self-contained reference for both researchers andgraduate students of general topology . Information is made particularly accessible withthe inclusion of an extensive index and bibliography .
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Since quasi-uniform spaces were defined in 1948, a diverse and widely dispersed literatureconcerning them has emerged
1. Elementary Properties of Quasi-Uniformities and Quasi-Proximities 2. Approximations of Symmetry 3. Completeness 4. Topological Ordered Spaces 5. Covering Properties of Quasi-Uniform Spaces 6. Transitive Spaces 7. Quasi-Metrizable Spaces
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Produktdetaljer
ISBN
9780824718398
Publisert
1982-05-03
Utgiver
Vendor
CRC Press Inc
Vekt
453 gr
Høyde
254 mm
Bredde
178 mm
Aldersnivå
UU, UP, P, 05, 06
Språk
Product language
Engelsk
Format
Product format
Heftet
Antall sider
232