Primeness property for central polynomials of verbally prime P.I. algebras

Abstract

Let f and g be two noncommutative polynomials in disjoint sets of variables. An algebra A is verbally prime if whenever f· g is an identity for A then either f or g is also an identity. As an analogue of this property Regev proved that the verbally prime algebra Mk(F) of k× k matrices over an infinite field F has the following primeness property for central polynomials: whenever the product f· g is a central polynomial for Mk(F) then both f and g are central polynomials. In this paper we prove that over a field of characteristic zero Regev' s result holds for the verbally prime algebras Mk(E) and Mk,k(E), where E is the infinite dimensional Grassmann algebra.