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Hyperbolic Geometry
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Publisher: Springer-verlag
OR
Book: Hyperbolic Geometry
The geometry of the hyperbolic plane has been an active and fascinating field of mathematical inquiry for most of the past two centuries. This book provides a self-contained introduction to the subject, taking the approach that hyperbolic geometry consists of the study of those quantities invariant under the action of a natural group of transformations. Topics covered include the upper half-space model of the hyperbolic plane, MC6bius transformations, the general MC6bius group and the subgroup preserving path length in the upper half-space model, arc-length and distance, the Poincare disc model, convex subsets of the hyperbolic plane, and the Gauss-Bonnet formula for the area of a hyperbolic polygon and its applications. The style and level of the book, which assumes few mathematical prerequisites, make it an ideal introduction to this subject, providing the reader with a firm grasp of the concepts and techniques of this beautiful area of mathematics.
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Details of Book: Hyperbolic Geometry Book: Hyperbolic Geometry
Author: Anderson
ISBN:
ISBN-13:
Binding: Paperback
Publishing Date: 1999
Publisher: Springer-verlag
Number of Pages: 230
Author: Anderson
ISBN:
1852331569
ISBN-13:
9781852331566
,978-1852331566
Binding: Paperback
Publishing Date: 1999
Publisher: Springer-verlag
Number of Pages: 230
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Book: Hyperbolic Geometry by Anderson
ISBN Number: 1852331569, 9781852331566, 978-1852331566