The Graded Algebras with a Graded Identity of Degree 2

Abstract

This paper is devoted to the study of graded associative algebras that satisfy a graded polynomial identity of degree 2. % Let G be a finite abelian group, F a field of characteristic zero and A a G-graded F-algebra. % We prove that, for F algebraically closed, if Ae satisfies a polynomial identity g=g(x1(e), …, xn(e))∈F XG of degree 2, then A is either nilpotent or has commutative neutral component, % and we ensure that the G-graded variety WG determined by g is equal to either varG([x(e),y(e)]) or varG(N) for some nilpotent G-graded algebra N. % Posteriorly, we investigate the implications of Ae being central in A. The results obtained allow us to prove that, when G is finite cyclic, if A is finitely generated and Ae is central in A, then the commutator ideal of A is nilpotent, and the algebra A(-)=(A,[\ ,\ ]) is a solvable Lie algebra, % and, if G has odd order, then [x1,x2][x3,x4]·s[x2d-1,x2d]0 in A, for some d∈N.