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I want to make a project at differential geometry about the Hairy Ball theorem and its applications. I was thinking of including a proof of the theorem in the project. Using the Poincare-Hopf Theorem seems easy enough, but I was thinking that this proves the desired result using a stronger theorem (just like proving Liouville's Theorem in complex analysis using Picard's theorem).

Is there a simple proof of the fact that there is no continuous non-zero vector field on the even dimensional sphere? It is good enough if the proof works only for $S^2$, because that is the case I will be focusing on in the applications.

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    `[insert joke about hairy balls here]`.2011-12-12

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The proof can be found on this site:

http://people.ucsc.edu/~lewis/Math208/hairyball.pdf

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The simplest I can remember off the top of my head is this:


Assume there is such a vector field. Let $v_x$ denote the vector at the point $x$. Now, define the homotopy $H: S^2\times [0, 1] \rightarrow S^2$ by the following: $H(x, t)$ is the point $t\pi$ radians away from $x$ along the great circle defined by $v_x$. This gives a homotopy between the identity and the antipodal map on $S^2$, which is impossible, since the antipodal map has degree $-1$. Hence there can be no such vector field.

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    Note that reflection in one coordinate has degree -1, so that the map from x to -x has degree (-1)^(n+1) where n is the dimension of the sphere. Bonus fact that any fixed point free map from the sphere to itself is homotopic to the antipodal map via parameterized normalized line segments between -x and f(x), necessarily not crossing the origin.2017-03-23
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There is an elegant and self-contained proof by Milnor: Analytic proofs of the "hairy ball theorem", American Math. Monthly, 85 (1978), 521-524. The paper is reprinted in his collected works and can be downloaded for pay here:

http://www.jstor.org/pss/2320860

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    @EricWilson Everyone is goint to download at scihub anyway.2016-12-19