Skip to content
Register Sign in Wishlist

Geometry from a Differentiable Viewpoint

2nd Edition

textbook
  • Date Published: December 2012
  • availability: Available
  • format: Paperback
  • isbn: 9780521133111

Paperback

Add to wishlist

Other available formats:
Hardback, eBook


Request inspection copy

Lecturers may request a copy of this title for inspection

Description
Product filter button
Description
Contents
Resources
Courses
About the Authors
  • The development of geometry from Euclid to Euler to Lobachevsky, Bolyai, Gauss and Riemann is a story that is often broken into parts – axiomatic geometry, non-Euclidean geometry and differential geometry. This poses a problem for undergraduates: Which part is geometry? What is the big picture to which these parts belong? In this introduction to differential geometry, the parts are united with all of their interrelations, motivated by the history of the parallel postulate. Beginning with the ancient sources, the author first explores synthetic methods in Euclidean and non-Euclidean geometry and then introduces differential geometry in its classical formulation, leading to the modern formulation on manifolds such as space-time. The presentation is enlivened by historical diversions such as Huygens's clock and the mathematics of cartography. The intertwined approaches will help undergraduates understand the role of elementary ideas in the more general, differential setting. This thoroughly revised second edition includes numerous new exercises and a new solution key. New topics include Clairaut's relation for geodesics and the use of transformations such as the reflections of the Beltrami disk.

    • Takes historical approach discussing the discovery and construction of non-Euclidean geometry and significant events like Huygens's clock, the mathematics of cartography and Clairaut's relation for geodesics
    • Offers various intertwining approaches to geometry: students begin with the high school synthetic approach and, with development of the differential approach, learn how elementary ideas are related in the new setting
    • Chapter 4 gives a thorough treatment of non-Euclidean geometry, as developed by Lobachevsky and Bolyai, while Chapter 14 parallels this treatment in the differential geometric manner
    Read more

    Reviews & endorsements

    Review of the first edition: '… an unusual and interesting account of two subjects and their close historical interrelation.' The Mathematical Gazette

    '… the author has succeeded in making differential geometry an approachable subject for advanced undergraduates.' Andrej Bucki, Mathematical Reviews

    See more reviews

    Customer reviews

    Not yet reviewed

    Be the first to review

    Review was not posted due to profanity

    ×

    , create a review

    (If you're not , sign out)

    Please enter the right captcha value
    Please enter a star rating.
    Your review must be a minimum of 12 words.

    How do you rate this item?

    ×

    Product details

    • Edition: 2nd Edition
    • Date Published: December 2012
    • format: Paperback
    • isbn: 9780521133111
    • length: 368 pages
    • dimensions: 253 x 175 x 18 mm
    • weight: 0.63kg
    • contains: 164 b/w illus. 203 exercises
    • availability: Available
  • Table of Contents

    Part I. Prelude and Themes: Synthetic Methods and Results:
    1. Spherical geometry
    2. Euclid
    3. The theory of parallels
    4. Non-Euclidean geometry
    Part II. Development: Differential Geometry:
    5. Curves in the plane
    6. Curves in space
    7. Surfaces
    8. Curvature for surfaces
    9. Metric equivalence of surfaces
    10. Geodesics
    11. The Gauss–Bonnet theorem
    12. Constant-curvature surfaces
    Part III. Recapitulation and Coda:
    13. Abstract surfaces
    14. Modeling the non-Euclidean plane
    15. Epilogue: where from here?

  • Author

    John McCleary, Vassar College, New York
    John McCleary is Professor of Mathematics at Vassar College on the Elizabeth Stillman Williams Chair. His research interests lie at the boundary between geometry and topology, especially where algebraic topology plays a role. His papers on topology have appeared in Inventiones Mathematicae, the American Journal of Mathematics and other journals, and he has written expository papers that have appeared in American Mathematical Monthly. He is also interested in the history of mathematics, especially the history of geometry in the nineteenth century and of topology in the twentieth century. He is the author of A User's Guide to Spectral Sequences and A First Course in Topology: Continuity and Dimension, and he has edited proceedings in topology and in history, as well as a volume of the collected works of John Milnor. He has been a visitor to the mathematics institutes in Goettingen, Strasbourg and Cambridge, and to MSRI in Berkeley.

Related Books

also by this author

Sorry, this resource is locked

Please register or sign in to request access. If you are having problems accessing these resources please email lecturers@cambridge.org

Register Sign in
Please note that this file is password protected. You will be asked to input your password on the next screen.

» Proceed

You are now leaving the Cambridge University Press website. Your eBook purchase and download will be completed by our partner www.ebooks.com. Please see the permission section of the www.ebooks.com catalogue page for details of the print & copy limits on our eBooks.

Continue ×

Continue ×

Continue ×
warning icon

Turn stock notifications on?

You must be signed in to your Cambridge account to turn product stock notifications on or off.

Sign in Create a Cambridge account arrow icon
×

Find content that relates to you

Join us online

This site uses cookies to improve your experience. Read more Close

Are you sure you want to delete your account?

This cannot be undone.

Cancel

Thank you for your feedback which will help us improve our service.

If you requested a response, we will make sure to get back to you shortly.

×
Please fill in the required fields in your feedback submission.
×