Bagels, beach balls, and the Poincar Conjecture - PowerPoint PPT Presentation

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Bagels, beach balls, and the Poincar Conjecture

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Title: Bagels, beach balls, and the Poincar Conjecture


1
Bagels, beach balls, and the Poincaré Conjecture
  • Emily Dryden
  • Bucknell University

2
(No Transcript)
3
Poincaré
4
Confused topologists
5
Homeomorphisms
  • A homeomorphism is a continuous stretching and
    bending of an object into a new shape.
  • Poincaré Conjecture is about objects being
    homeomorphic to a sphere in three dimensions

6
Two dimensions surfaces
  • Smooth no jagged peaks or ridges
  • Compact can put it in a box
  • Orientable distinguishable top and bottom
  • No boundary

7
Classifying such surfaces
  • Genus number of holes
  • Example of surface with 0 holes?
  • Example of surface with 1 hole?
  • Example of surface with 2 holes?
  • And so on.....
  • What about classifying higher-dimensional objects?

8
Spheres of many dimensions
?
1-sphere
2-sphere
3-sphere
9
Distinguishing objects homeomorphic to 3-sphere
  • Count holes?
  • 2-sphere simple closed curves
  • Torus loop that cannot be deformed to a point?

10
Poincaré asks...
  • If a compact 3-dimensional object M has the
    property that every simple closed curve within
    the object can be deformed continuously to a
    point, does it follow that M is homeomorphic to
    the 3-sphere?
  • Poincaré Conjecture answer is yes

11
More, more, more!
  • Dimensions 5 and higher proved in 1960s by
    Smale, Stallings, Wallace
  • Dimension 4 proved in 1980s by Freedman
  • Dimension 3 lots of people tried...

12
A million bucks
13
An elusive character
arXivmath/0211159 (39 pages)
arXivmath/0303109 (22 pages)
arXivmath/0307245 (7 pages)
Perelman
14
The full story
http//www.arxiv.org/abs/math/0605667 (200 pages)
15
The intrigue
16
How did they do it?
  • Metric way to measure distance
  • Curvature how much does object bend? (line,
    circle, plane, sphere)
  • Ricci flow solutions to a certain differential
    equation, says metric changes with time so that
    distances decrease in directions of positive
    curvature

17
Ricci what?
  • Think heat equation heat one end of cold rod,
    heat flows through rod until have even
    temperature distribution
  • Ricci flow positive curvature spreads out until,
    in the limit, manifold has constant curvature
  • Perelman dealt with singularities that could
    arise during flow, showed they were nice
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