Sperner’s lemma

Let $A B C$ be a triangle, and let $S$ be the set of vertices of some triangulation $T$ of $A B C$ . Let $f$ be a mapping of $S$ into a three-element set, say $\{1,2,3\}=T$ (indicated by red/green/blue respectively in the figure), such that:

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any point $P$ of $S$ , if it is on the side $A B$ , satisfies $f(P)\in\{1,2\}$
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similarly if $P$ is on the side $B C$ , then $f(P)\in\{2,3\}$
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if $P$ is on the side $C A$ , then $f(P)\in\{3,1\}$

(It follows that $f(A)=1,f(B)=2,f(C)=3$ .) Then some (triangular) simplex of $T$ , say $U V W$ , satisfies

f(U)=1\qquad f(V)=2\qquad f(W)=3\;.

We will informally sketch a proof of a stronger statement: Let $M$ (resp. $N$ ) be the number of simplexes satisfying (1) and whose vertices have the same orientation as $A B C$ (resp. the opposite orientation). Then $M-N=1$ (whence $M>0$ ).

The proof is in the style of well-known proofs of, for example, Stokes’s theorem in the plane, or Cauchy’s theorems about a holomorphic function.

Define an antisymmetric function $d:T\times T\to\mathbb{Z}$ by

d(1,1)=d(2,2)=d(3,3)=0

d(1,2)=d(2,3)=d(3,1)=1

d(2,1)=d(3,2)=d(1,3)=-1\;.

Let’s define a “circuit” of size $n$ as an injective mapping $z$ of the cyclic group $\mathbb{Z}/n\mathbb{Z}$ into $V$ such that $z(n)$ is adjacent to $z(n+1)$ for all $n$ in the group.

Any circuit $z$ has what we will call a contour integral $I z$ , namely

Iz=\sum_{n}d(z(n),z(n+1))\;.

Let us say that two vertices $P$ and $Q$ are equivalent if $f(P)=f(Q)$ .

There are four steps:

1) Contour integrals are added when their corresponding circuits are juxtaposed.

2) A circuit of size 3, hitting the vertices of a simplex $P Q R$ , has contour integral

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0 if any two of $P$ , $Q$ , $R$ are equivalent, else
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+3 if they are inequivalent and have the same orientation as $A B C$ , else
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-3

3) If $y$ is a circuit which travels around the perimeter of the whole triangle $A B C$ , and with same orientation as $A B C$ , then $Iy=3$ .

4) Combining the above results, we get

3=\sum Iw=3M-3N

where the sum contains one summand for each simplex $P Q R$ .

Remarks: In the figure, $M=2$ and $N=1$ : there are two “red-green-blue” simplexes and one blue-green-red.

With the same hypotheses as in Sperner’s lemma, there is such a simplex $U V W$ which is connected (along edges of the triangulation) to the side $A B$ (resp. $B C$ , $C A$ ) by a set of vertices $v$ for which $f(v)\in\{1,2\}$ (resp. $\{2,3\}$ , $\{3,1\})$ . The figure illustrates that result: one of the red-green-blue simplexes is connected to the red-green side by a red-green “curve”, and to the other two sides likewise.

The original use of Sperner’s lemma was in a proof of Brouwer’s fixed point theorem in two dimensions.

Title	Sperner’s lemma
Canonical name	SpernersLemma
Date of creation	2013-03-22 13:44:33
Last modified on	2013-03-22 13:44:33
Owner	mathcam (2727)
Last modified by	mathcam (2727)
Numerical id	12
Author	mathcam (2727)
Entry type	Theorem
Classification	msc 55M20