Jordan homomorphisms onto nondegenerate Jordan algebras

A structure theorem is given for nondegenerate Jordan algebras J satisfying the ascending chain condition on annihilators of a single element and such that J contains no infinite direct sum of inner deals inside the inner ideal generated by each element x g J. As a consequence of this theorem and of

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

In this paper we give a complete description of primitive Jordan algebras over fields of characteristic not two in the spirit of E. I. Zel'manov's classification of prime Jordan algebras (1983, Siberian Math. J. 24, No. 1, 73-85). We also prove that associative tight envelopes of special primitive J