Hua's identity

In algebra, Hua's identity[1] states that for any elements a, b in a division ring,

a-(a^{-1}+(b^{-1}-a)^{-1})^{-1}=aba

whenever $ab\neq 0,1$ . Replacing $b$ with $-b^{-1}$ gives another equivalent form of the identity:

(a+ab^{-1}a)^{-1}+(a+b)^{-1}=a^{-1}.

Hua's theorem

The identity is used in a proof of Hua's theorem,[2][3] which states that if $\sigma \colon K\to L$ is a function between division rings satisfying

\sigma (a+b)=\sigma (a)+\sigma (b),\quad \sigma (1)=1,\quad \sigma (a^{-1})=\sigma (a)^{-1},

then $\sigma$ is a homomorphism or an antihomomorphism. This theorem is connected to the fundamental theorem of projective geometry.

Proof of the identity

One has $(a-aba)(a^{-1}+(b^{-1}-a)^{-1})=1-ab+ab(b^{-1}-a)(b^{-1}-a)^{-1}=1.$

The proof is valid in any ring as long as $a,b,ab-1$ are units.[4]

References

Cohn 2003, §9.1
Cohn 2003, Theorem 9.1.3
"Is this map of domains a Jordan homomorphism?". math.stackexchange.com. Retrieved 2016-06-28.
Jacobson, § 2.2. Exercise 9.

Cohn, Paul M. (2003). Further algebra and applications (Revised ed. of Algebra, 2nd ed.). London: Springer-Verlag. ISBN 1-85233-667-6. Zbl 1006.00001.
Jacobson, Nathan (2009), Basic Algebra 1 (2nd ed.), Dover, ISBN 978-0-486-47189-1

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[1] Cohn 2003, §9.1

[2] Cohn 2003, Theorem 9.1.3

[3] "Is this map of domains a Jordan homomorphism?". math.stackexchange.com. Retrieved 2016-06-28.

[4] Jacobson, § 2.2. Exercise 9.