Subplane Covered Nets
1st Edition
Published on 3. January 2000
Book
Hardback
388 pages
978-0-8247-9008-0 (ISBN)
Description
This work confronts the question of geometric processes of derivation, specifically the derivation of affine planes - keying in on construction techniques and types of transformations in which lines of a newly-created plane can be understood as subplanes of the original plane. The book provides a theory of subplane covered nets without restriction to the finite case or imposing commutativity conditions.
More details
Series
Language
English
Place of publication
Bosa Roca
United States
Publishing group
Taylor & Francis Inc
Target group
College/higher education
Professional and scholarly
Dimensions
Height: 280 mm
Width: 210 mm
Weight
680 gr
ISBN-13
978-0-8247-9008-0 (9780824790080)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Other editions
Additional editions
Norman L. Johnson
Subplane Covered Nets
E-Book
01/2000
1st Edition
CRC Press
€350.99
Available for download
Norman L. Johnson
Subplane Covered Nets
E-Book
01/2000
1st Edition
CRC Press
€350.99
Available for download
Person
Norman L. Johnson
Content
A brief overview; projective geometries; beginning derivation; spreads; derivable nets; the Hughes planes; Desarguesian planes; Pappian planes; characterizations of geometries; derivable nets and geometries; structure theory for derivable nets; dual spreads and Baer subplanes; derivation as a geometric process; embedding; classification of subplane covered nets; subplane covered affine planes; direct products; parallelisms; partial parallelisms with deficiency; Baer extensions; translation planes admitting Baer groups; spreads covered by pseudo-Reguli; conical and ruled planes over fields; spreads which are dual spreads; partial flocks of deficiency one; Skew-Hall planes.