Additivity of multiplicative maps on triangular rings

Suppose R is a ring with 1 and C a central subring of R. Let T,(R) be the C-algebra of upper triangular n x n matrices over R. Recently several authors have shown that if R is sufficiently well behaved, then every C-automorphism of T,,(R) is the composites of an inner automorphism and an automorphis

Let A and B be two Jordan algebras. In this paper, we investigate the additivity of maps φ from A onto B that are bijective and satisfy for all a, b ∈ A. If A contains an idempotent which satisfies some conditions, then φ is additive. This result generalizes all results about additivity of Jordan m

Let A be a standard subalgebra of a nest algebra on a Hilbert space of dimension greater than one and B an arbitrary algebra. A Jordan elementary map of A × B is a pair (M, M \* ) where M : A → B and M \* : B → A are two maps satisfying In this note, it is proved that for a special class of surject