Hua's identity

In algebra, Hua's identity^[1] named after Hua Luogeng, states that for any elements a, b in a division ring, $${\displaystyle a-{(a^{-1}+{(b^{-1}-a)}^{-1})}^{-1}=aba}$$ whenever ${\displaystyle ab\ne 0,1}$. Replacing ${\displaystyle b}$ with ${\displaystyle -b^{-1}}$ gives another equivalent form of the identity: $${\displaystyle {(a+a{b}^{-1}a)}^{-1}+(a+b{)}^{-1}=a^{-1}.}$$

Hua's theorem

The identity is used in a proof of Hua's theorem,^[2] which states that if ${\displaystyle \sigma }$ is a function between division rings satisfying $${\displaystyle \sigma (a+b)=\sigma (a)+\sigma (b),\sigma (1)=1,\sigma (a^{-1})=\sigma (a{)}^{-1},}$$ then ${\displaystyle \sigma }$ is a homomorphism or an antihomomorphism. This theorem is connected to the fundamental theorem of projective geometry.

Proof of the identity

One has $${\displaystyle (a-aba)(a^{-1}+{(b^{-1}-a)}^{-1})=1-ab+ab(b^{-1}-a){(b^{-1}-a)}^{-1}=1.}$$ The proof is valid in any ring as long as ${\displaystyle a,b,ab-1}$ are units.^[3]

References