The subalgebra of graded central polynomials of an associative algebra

Abstract

Let F be a field and let F X be the free unital associative F-algebra on the free generating set X = \ x1, x2, … \. A subalgebra (a vector subspace) V in F X is called a T-subalgebra (a T-subspace) if φ (V) ⊂eq V for all endomorphisms φ of F X . For an algebra G, its central polynomials form a T-subalgebra C(G) in F X . Over a field of characteristic p > 2 there are algebras G whose algebras of all central polynomials C (G) are not finitely generated as T-subspaces in F X . However, no example of an algebra G such that C(G) is not finitely generated as a T-subalgebra is known yet. In the present paper we construct the first example of a 2-graded unital associative algebra B over a field of characteristic p>2 whose algebra C2 (B) of all 2-graded central polynomials is not finitely generated as a T2-subalgebra in the free 2-graded unital associative F-algebra F Y,Z . Here Y = \ y1, y2, … \ and Z = \ z1, z2, … \ are sets of even and odd free generators of F Y,Z , respectively. We hope that our example will help to construct an algebra G whose algebra C(G) of (ordinary) central polynomials is not finitely generated as a T-subalgebra in F X .