On Functional Identities in Prime Rings with Involution

In the present paper we study generalized functional identities involving multiadditive functions. Our results simultaneously generalize Martindale's theorem on prime rings with generalized polynomial identities and Bresar's results on general-ǐzed functional identities of degree two.

The concept of a generalized functional identity GFI with anti automorphisms and derivations is a generalization of the notion of a generalized polynomial Ž . Ž . identity GPI with anti automorphisms and derivations. In the present paper we show that either a prime ring is GPI or such GFIs have only

Let R be a prime ring with involution of the first kind, and characteristic / 2, 3. Let K denote the skew elements of R, and let C denote the extended centroid of Ž . R . Assume that RC : C / 1, 4, 16. It is shown that any Lie derivation of K into ² : itself can be extended to an ordinary derivation

For a submonoid S of a torsion-free abelian-by-finite group, we describe the height-one prime ideals of the semigroup algebra K S . As an application we investigate when such algebras are unique factorization rings.  2002 Elsevier Science (USA) Let S be a submonoid of a group. In this paper we inv