Witt's identity

This fact is related to: commutator calculus
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Statement

In terms of right-action convention

Let ${\displaystyle a,b,c}$ be elements of an arbitrary group ${\displaystyle G}$. Then:

${\displaystyle [[a,b^{-1}],c{]}^b\cdot [[b,c^{-1}],a{]}^c\cdot [[c,a^{-1}],b{]}^a=e}$

where ${\displaystyle [x,y]=x^{-1}{y}^{-1}xy}$ and ${\displaystyle x^y=y^{-1}xy}$, and ${\displaystyle e}$ is the identity element of the group.

Related results

• Jacobi identity
• Three subgroup lemma

Proof

In terms of right-action convention

Given: A group ${\displaystyle G}$, elements ${\displaystyle a,b,c\in G}$. ${\displaystyle e}$ is the identity element.

To prove: ${\displaystyle [[a,b^{-1}],c{]}^b\cdot [[b,c^{-1}],a{]}^c\cdot [[c,a^{-1}],b{]}^a=e}$ where ${\displaystyle [x,y]:=x^{-1}{y}^{-1}xy}$ and ${\displaystyle x^y=y^{-1}xy}$.

Proof: We start out with the first term on the left side:

${\displaystyle [[a,b^{-1}],c{]}^b=[a^{-1}ba{b}^{-1},c{]}^b=b^{-1}[a^{-1}ba{b}^{-1},c]b=b^{-1}b{a}^{-1}{b}^{-1}a{c}^{-1}{a}^{-1}ba{b}^{-1}cb=a^{-1}{b}^{-1}a{c}^{-1}{a}^{-1}ba{b}^{-1}cb}$

Similarly, we have:

${\displaystyle [[b,c^{-1}],a{]}^c=b^{-1}{c}^{-1}b{a}^{-1}{b}^{-1}cb{c}^{-1}ac}$

and:

${\displaystyle [[c,a^{-1}],b{]}^a=c^{-1}{a}^{-1}c{b}^{-1}{c}^{-1}ac{a}^{-1}ba}$

Multiplying these, all terms cancel and we obtain the identity element, as desired.