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Non-Euclidean Geometry and Curvature: Two-Dimensional Spaces, Volume 3
 
James W. Cannon Brigham Young University, Provo, UT
Non-Euclidean Geometry and Curvature
Softcover ISBN:  978-1-4704-3716-9
Product Code:  MBK/110
List Price: $59.00
MAA Member Price: $53.10
AMS Member Price: $47.20
eBook ISBN:  978-1-4704-4307-8
Product Code:  MBK/110.E
List Price: $45.00
MAA Member Price: $40.50
AMS Member Price: $36.00
Softcover ISBN:  978-1-4704-3716-9
eBook: ISBN:  978-1-4704-4307-8
Product Code:  MBK/110.B
List Price: $104.00 $81.50
MAA Member Price: $93.60 $73.35
AMS Member Price: $83.20 $65.20
Non-Euclidean Geometry and Curvature
Click above image for expanded view
Non-Euclidean Geometry and Curvature: Two-Dimensional Spaces, Volume 3
James W. Cannon Brigham Young University, Provo, UT
Softcover ISBN:  978-1-4704-3716-9
Product Code:  MBK/110
List Price: $59.00
MAA Member Price: $53.10
AMS Member Price: $47.20
eBook ISBN:  978-1-4704-4307-8
Product Code:  MBK/110.E
List Price: $45.00
MAA Member Price: $40.50
AMS Member Price: $36.00
Softcover ISBN:  978-1-4704-3716-9
eBook ISBN:  978-1-4704-4307-8
Product Code:  MBK/110.B
List Price: $104.00 $81.50
MAA Member Price: $93.60 $73.35
AMS Member Price: $83.20 $65.20
  • Book Details
     
     
    2017; 105 pp
    MSC: Primary 51; 53

    This is the final volume of a three volume collection devoted to the geometry, topology, and curvature of 2-dimensional spaces. The collection provides a guided tour through a wide range of topics by one of the twentieth century's masters of geometric topology. The books are accessible to college and graduate students and provide perspective and insight to mathematicians at all levels who are interested in geometry and topology.

    Einstein showed how to interpret gravity as the dynamic response to the curvature of space-time. Bill Thurston showed us that non-Euclidean geometries and curvature are essential to the understanding of low-dimensional spaces. This third and final volume aims to give the reader a firm intuitive understanding of these concepts in dimension 2. The volume first demonstrates a number of the most important properties of non-Euclidean geometry by means of simple infinite graphs that approximate that geometry. This is followed by a long chapter taken from lectures the author gave at MSRI, which explains a more classical view of hyperbolic non-Euclidean geometry in all dimensions. Finally, the author explains a natural intrinsic obstruction to flattening a triangulated polyhedral surface into the plane without distorting the constituent triangles. That obstruction extends intrinsically to smooth surfaces by approximation and is called curvature. Gauss's original definition of curvature is extrinsic rather than intrinsic. The final two chapters show that the book's intrinsic definition is equivalent to Gauss's extrinsic definition (Gauss's “Theorema Egregium” (“Great Theorem”)).

    Readership

    Graduate and undergraduate students and researchers interested in topology.

    This item is also available as part of a set:
  • Table of Contents
     
     
    • Chapters
    • A graphical introduction to hyperbolic geometry
    • Hyperbolic geometry
    • Gravity as curvature
    • Curvature by polyhedral approximation
    • Curvature as a length derivative
    • Theorema egregium
    • Curvature appendix
  • Reviews
     
     
    • Like its predecessors, it is well written and full of exciting twists and turns, and will delight undergraduates, graduates, and those of us looking for something new to add to our geometry and topology classes.

      Alan S. McRae, Mathematical Reviews
    • The reviewer likes the geometric style of the book, written by an expert in this beautiful area of mathematics...Reading this book made me want to learn more about 3-dimensional geometry.

      Joseph Malkoun, Zentralblatt MATH
    • Many readers will be hooked by Cannon's aesthetics and proof exposition, where geometric intuition and topological arguments play leading roles...Cannon's books are worth every cent. I have in the past gifted Hilbert & Cohn-Voseen and Rademacher and Toeplitz to my students. Now I have Cannon's trio to add to my list of giftables.

      Tushar Das, MAA Reviews
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
2017; 105 pp
MSC: Primary 51; 53

This is the final volume of a three volume collection devoted to the geometry, topology, and curvature of 2-dimensional spaces. The collection provides a guided tour through a wide range of topics by one of the twentieth century's masters of geometric topology. The books are accessible to college and graduate students and provide perspective and insight to mathematicians at all levels who are interested in geometry and topology.

Einstein showed how to interpret gravity as the dynamic response to the curvature of space-time. Bill Thurston showed us that non-Euclidean geometries and curvature are essential to the understanding of low-dimensional spaces. This third and final volume aims to give the reader a firm intuitive understanding of these concepts in dimension 2. The volume first demonstrates a number of the most important properties of non-Euclidean geometry by means of simple infinite graphs that approximate that geometry. This is followed by a long chapter taken from lectures the author gave at MSRI, which explains a more classical view of hyperbolic non-Euclidean geometry in all dimensions. Finally, the author explains a natural intrinsic obstruction to flattening a triangulated polyhedral surface into the plane without distorting the constituent triangles. That obstruction extends intrinsically to smooth surfaces by approximation and is called curvature. Gauss's original definition of curvature is extrinsic rather than intrinsic. The final two chapters show that the book's intrinsic definition is equivalent to Gauss's extrinsic definition (Gauss's “Theorema Egregium” (“Great Theorem”)).

Readership

Graduate and undergraduate students and researchers interested in topology.

This item is also available as part of a set:
  • Chapters
  • A graphical introduction to hyperbolic geometry
  • Hyperbolic geometry
  • Gravity as curvature
  • Curvature by polyhedral approximation
  • Curvature as a length derivative
  • Theorema egregium
  • Curvature appendix
  • Like its predecessors, it is well written and full of exciting twists and turns, and will delight undergraduates, graduates, and those of us looking for something new to add to our geometry and topology classes.

    Alan S. McRae, Mathematical Reviews
  • The reviewer likes the geometric style of the book, written by an expert in this beautiful area of mathematics...Reading this book made me want to learn more about 3-dimensional geometry.

    Joseph Malkoun, Zentralblatt MATH
  • Many readers will be hooked by Cannon's aesthetics and proof exposition, where geometric intuition and topological arguments play leading roles...Cannon's books are worth every cent. I have in the past gifted Hilbert & Cohn-Voseen and Rademacher and Toeplitz to my students. Now I have Cannon's trio to add to my list of giftables.

    Tushar Das, MAA Reviews
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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