The Poincaré Half-plane: A Gateway to Modern Geometry

الغلاف الأمامي
Jones & Bartlett Learning, 1993 - 298 من الصفحات
The Poincare Half-Planeprovides an elementary and constructive development of this geometry that brings the undergraduate major closer to current geometric research. At the same time, repeated use is made of high school geometry, algebra, trigonometry, and calculus, thus reinforcing the students' understanding of these disciplines as well as enhancing their perception of mathematics as a unified endeavor.
 

ما يقوله الناس - كتابة مراجعة

لم نعثر على أي مراجعات في الأماكن المعتادة.

المحتوى

EUCLIDEAN RIGID MOTIONS
35
INVERSIONS
51
THE HYPERBOLIC PLANE
63
EUCLIDEAN VERSUS HYPERBOLIC GEOMETRY
79
THE ANGLES OF THE HYPERBOLIC TRIANGLE
93
HYPERBOLIC AREA
109
THE TRIGONOMETRY OF THE HYPERBOLIC
119
The general hyperbolic triangle
125
A review of lengths and areas on surfaces
190
Gausss formula for the curvature at a point
196
Exercises
205
The unit disk model and its flow diagrams
213
Explicit rigid motions of the unit disk model
221
Regular tesselations of the unit disk model
228
A BRIEF HISTORY OF NONEUCLIDEAN
247
Exercises
254

COMPLEX NUMBERS AND RIGID MOTIONS
131
ABSOLUTE GEOMETRY AND THE ANGLES
161
DIFFERENTIAL GEOMETRY AND GAUSSIAN
183

عبارات ومصطلحات مألوفة

نبذة عن المؤلف (1993)

SAUL STAHL, PhD, is Professor of Mathematics at the University of Kansas and a former systems programmer for IBM. He received his MA from the University of California, Berkeley, and his PhD from Western Michigan University. His main field of expertise is combinatorics. In 1986 he received the Carl A. Allendoerfer Award for excellence in expository writing from the Mathematical Association of America.

معلومات المراجع