Differential Geometry of Three Dimensions
Differential Geometry of Three Dimensions
$53.99
USDOriginally published in 1927, as the first of a two-part set, this informative and systematically organised textbook, primarily aimed at university students, contains a vectorial treatment of geometry, reasoning that by the use of such vector methods, geometry is able to be 'both simplified and condensed'. Chapters I-XI discuss the more elementary parts of the subject, whilst the remainder is devoted to an exploration of the more complex differential invariants for a surface and their applications. Chapter titles include, 'Curves with torsion', 'Geodesics and geodesic parallels' and 'Triply orthogonal systems of surfaces'. Diagrams are included to supplement the text. Providing a detailed overview of the subject and forming a solid foundation for study of multidimensional differential geometry and the tensor calculus, this book will prove an invaluable reference work to scholars of mathematics as well as to anyone with an interest in the history of education.
Product details
April 2016Paperback
9781316603840
282 pages
218 × 140 × 18 mm
0.39kg
Available
Table of Contents
- Preface
- Introduction. Vector notation and formulae
- 1. Curves with torsion
- 2. Envelopes, developable surfaces
- 3. Curvilinear coordinates on a surface. Fundamental magnitudes
- 4. Curves on a surface
- 5. The equations of Gauss and of Codazzi
- 6. Geodesics and geodesic parallels
- 7. Quadric surfaces, ruled surfaces
- 8. Evolute or surface of centres. Parallel surfaces
- 9. Conformal and spherical representations. Minimal surfaces
- 10. Congruences of lines
- 11. Triply orthogonal systems of surfaces
- 12. Differential invariants for a surface
- Conclusion. Further recent advances
- Note 1. Directions on a surface
- Note 2. On the curvatures of a surface
- Index.
