Topological spaces made by identifying opposite faces of a cube?

Question

My bashful, nameless, colleague asked me:

When you identify opposite faces of a square, then depending on where you twist or not, you get a torus, Klein bottle, or projective plane.

What spaces can you get when identifying opposite faces of a cube?

He was hoping for a reference.

Of course, if you do the same with a dodecahedron with the correct twist, you famously get the Poincare homology sphere! en.wikipedia.org/wiki/… — Russ Woodroofe, Commented Feb 4, 2014 at 1:01

j.c. · Accepted Answer · 2014-02-03 15:24:13Z

15

The ones that are manifolds were considered by Poincaré, and a nice discussion is on this page of the Manifold Atlas.

answered Mar 5, 2012 at 18:45

j.c.

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$\begingroup$ Many good answers, but I guess this is the most directly related one. $\endgroup$
– Allen Knutson
Commented Mar 6, 2012 at 18:11

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Ryan Budney · Accepted Answer · 2012-03-06 00:02:32Z

16

B. Everitt. 3-manifolds from platonic solids. Topology and its applications, 2004.

Covers everything you're asking for and more.

answered Mar 6, 2012 at 0:02

Ryan Budney

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$\begingroup$ This is wonderful! $\endgroup$
– Dylan Wilson
Commented Mar 6, 2012 at 6:14

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Aeryk · Accepted Answer · 2012-03-05 19:02:29Z

3

Chapter 4 of "Topology Now!" by Messer & Straffin gives a good undergraduate level overview of the topic of gluing polyhedral solids.

answered Mar 5, 2012 at 19:02

Aeryk

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Igor Rivin · Accepted Answer · 2012-03-05 21:11:55Z

3

You (or the bashful colleague) might want to look at Cannon/Floyd/Parry's program to analyze spaces of this ilk: http://www.math.vt.edu/people/floyd/research/software/twist.html

answered Mar 5, 2012 at 21:11

Igor Rivin

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4 Answers 4