Orthodox semigroups whose idempotents satisfy a certain identity

If σ is an automorphism and δ is a q-skew σ-derivation of a ring R, then the subring of invariants is the set R δ = r ∈ R δ r = 0 . The main result of this paper is Theorem. Let R be a prime algebra with a q-skew σ-derivation δ, where δ and σ are algebraic. If R δ satisfies a P. I., then R satisfies

Let R = denote the group of units of an associative algebra R over an infinite field F. We prove that if R is unitarily generated by its nilpotent elements, then R = satisfies a group identity precisely when R satisfies a nonmatrix polynomial identity. As an application, we examine the group algebra

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