Projective and Cayley-Klein Geometries

Buch | Hardcover
XVI, 434 Seiten
2006 | 2006
Springer Berlin (Verlag)
978-3-540-35644-8 (ISBN)

Lese- und Medienproben

Projective and Cayley-Klein Geometries - Arkadij L. Onishchik, Rolf Sulanke
128,39 inkl. MwSt

Projective geometry, and the Cayley-Klein geometries embedded into it, were originated in the 19th century. It is one of the foundations of algebraic geometry and has many applications to differential geometry.

The book presents a systematic introduction to projective geometry as based on the notion of vector space, which is the central topic of the first chapter. The second chapter covers the most important classical geometries which are systematically developed following the principle founded by Cayley and Klein, which rely on distinguishing an absolute and then studying the resulting invariants of geometric objects.

An appendix collects brief accounts of some fundamental notions from algebra and topology with corresponding references to the literature.

This self-contained introduction is a must for students, lecturers and researchers interested in projective geometry.

Projective Geometry.- Cayley-Klein Geometries.

From the reviews:

"This book is a comprehensive account of projective geometry and other classical geometries ... exhaustively covering all the details that anyone could ever ask for. It is well-written and the many exercises and many figures ... make it a very usable text. ... My proposed audience for this book coincides with the publisher's advice: graduate students and researchers in mathematics will find this book most useful ... . For these readers, the book is a jewel long yearned for, and finally found." (Gizem Karaali, MathDL, November, 2007)

Erscheint lt. Verlag 14.8.2006
Reihe/Serie Springer Monographs in Mathematics
Zusatzinfo XVI, 434 p. 69 illus.
Verlagsort Berlin
Sprache englisch
Maße 155 x 235 mm
Gewicht 810 g
Themenwelt Mathematik / Informatik Mathematik Geometrie / Topologie
Schlagworte Algebra • Cayley-Klein Geometry • Classical Groups • Elliptic Geometry • Finite • Geometry • Homogenous spaces • Hyperbolic Geometry • Invariant • Möbius Geometry • Projective Geometry • Projektive Geometrie • Symplectic Geometry • Topology • transformation groups
ISBN-10 3-540-35644-4 / 3540356444
ISBN-13 978-3-540-35644-8 / 9783540356448
Zustand Neuware
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