Graded monomial identities and almost non-degenerate gradings on matrices

Abstract

Let F be a field of characteristic zero, G be a group and R be the algebra Mn(F) with a G-grading. Bahturin and Drensky proved that if R is an elementary and the neutral component is commutative then the graded identities of R follow from three basic types of identities and monomial identities of length ≥ 2 bounded by a function f(n) of n. In this paper we prove the best upper bound is f(n)=n, more generally we prove that all the graded monomial identities of an elementary G-grading on Mn(F) follow from those of degree at most n. We also study gradings which satisfy no monomial identities but the trivial ones, which we call almost non-degenerate gradings. The description of non-degenerate elementary gradings on matrix algebras is reduced to the description of non-degenerate elementary gradings on matrix algebras that have commutative neutral component. We provide necessary conditions so that the grading on R is almost non-degenerate and we apply the results on monomial identities to describe all almost non-degenerate Z-gradings on Mn(F) for n≤ 5.