Möbius strip

A Möbius strip is a non-orientiable 2-dimensional surface with a 1-dimensional boundary. It can be embedded in $\mathbb{R}^{3}$ , but only has a single .

We can parameterize the Möbius strip by

x=r\cdot\cos{\theta},\quad y=r\cdot\sin{\theta},\quad z=(r-2)\tan{\frac{\theta% }{2}}.

The Möbius strip is therefore a subset of the solid torus.

Topologically, the Möbius strip is formed by taking a quotient space of $I^{2}=[0,1]\times[0,1]\subset\mathbb{R}^{2}$ . We do this by first letting $M$ be the partition of $I^{2}$ formed by the equivalence relation:

(1,x)\sim(0,1-x)\quad\mbox{where}\quad 0\leq x\leq 1,

and every other point in $I^{2}$ is only related to itself.

By giving $M$ the quotient topology given by the quotient map $p:I^{2}\to M$ we obtain the Möbius strip.

Schematically we can represent this identification as follows:

Diagram 1: The identifications made on $I^{2}$ to make a Möbius strip.

We identify two opposite sides but with different orientations.

Since the Möbius strip is homotopy equivalent to a circle, it has $\mathbb{Z}$ as its fundamental group. It is not however, homeomorphic to the circle, although its boundary is.

Title	Möbius strip
Canonical name	MobiusStrip
Date of creation	2013-03-22 12:55:28
Last modified on	2013-03-22 12:55:28
Owner	Mathprof (13753)
Last modified by	Mathprof (13753)
Numerical id	22
Author	Mathprof (13753)
Entry type	Definition
Classification	msc 54B15
Synonym	Möbius band
Related topic	KleinBottle
Related topic	Torus

Möbius strip

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