Jordan maps and zero Lie product determined algebras
Abstract
Let A be an algebra over a field F with char(F) 2. If A is generated as an algebra by [[A,A],[A,A]], then for every skew-symmetric bilinear map :A× A X, where X is an arbitrary vector space over F, the condition that (x2,x)=0 for all x∈ A implies that (xy,z) +(zx,y) + (yz,x)=0 for all x,y,z∈ A. This is applicable to the question of whether A is zero Lie product determined, and is also used in proving that a Jordan homomorphism from A onto a semiprime algebra B is the sum of a homomorphism and an antihomomorphism.
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