Książka Geometry and Topology Miles Reid

Geometry and Topology

Autor: Miles Reid
Język: Angielski
Oprawa: Miękka
Dostępność: Dostępna u dostawcy
Wysyłamy za 10-18 dni
292.44
Geometry provides a whole range of views on the universe, serving as the inspiration, technical tool...

Informacje o książce

Autor
Język
Angielski
Oprawa
Książka - Miękka
Data wydania
2005
strony
216
EAN
9780521613255
ISBN
0521613256
Enbook ID
04398931
Waga
378
Wymiary
176 x 246 x 11

Pełny opis

Geometry provides a whole range of views on the universe, serving as the inspiration, technical toolkit and ultimate goal for many branches of mathematics and physics. This book introduces the ideas of geometry, and includes a generous supply of simple explanations and examples. The treatment emphasises coordinate systems and the coordinate changes that generate symmetries. The discussion moves from Euclidean to non-Euclidean geometries, including spherical and hyperbolic geometry, and then on to affine and projective linear geometries. Group theory is introduced to treat geometric symmetries, leading to the unification of geometry and group theory in the Erlangen program. An introduction to basic topology follows, with the Möbius strip, the Klein bottle and the surface with g handles exemplifying quotient topologies and the homeomorphism problem. Topology combines with group theory to yield the geometry of transformation groups,having applications to relativity theory and quantum mechanics. A final chapter features historical discussions and indications for further reading. With minimal prerequisites, the book provides a first glimpse of many research topics in modern algebra, geometry and theoretical physics. The book is based on many years' teaching experience, and is thoroughly class-tested. There are copious illustrations, and each chapter ends with a wide supply of exercises. Further teaching material is available for teachers via the web, including assignable problem sheets with solutions.

Możesz być zainteresowany

140.34

Geometry

David A Brannan
302.70
44.81

How to Prove It

Daniel J. Velleman
194.23
793.17

General Topology

N. Bourbaki
279.09

General Topology

Nicolas Bourbaki
260.47

Text-Book of Geometry

G. A. WENTWORTH
98.60
169.72
275.90
214.75

The Poetics

Aristotle
57.06

Topology

Marco Manetti
296.92