On Lie isomorphisms of rings
Abstract
An associative ring A gives rise to the Lie ring A(-)=(A,[a,b ]=ab-ba). The subject of isomorphisms of Lie rings A(-) and [A,A] has attracted considerable attention in the literature. We prove that if the identity element of A decomposes into a sum of at least three full orthogonal idempotents, then any isomorphism from the Lie ring [A,A] to the Lie ring [B,B] is standard. For non-unital rings, the description is more intricate. Under a certain assumption on idempotents, we extend a Lie isomorphism from [A,A] to [B,B] to a homomorphism of associative rings A Aop B, where Aop=(A,a· b= b· a), and A Aop A Aop is the universal annihilator extension of the ring A Aop. The results obtained are then applied to the description of automorphisms and derivations of Lie algebras of infinite matrices.
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