On polynomial identities in nil-algebras

In this paper we study the polynomial identities of the loop algebra of some RA2 loops of order 16. ᮊ 1999 Academic Press \* This paper was written while the second-named author held a grant from CNPq of Brazil.

This means that any identity f of A is a consequence of identities in S, i.e., f can be obtained consequently from S by means of replacing of variables with polynomials, multiplication by polynomials and linear combination. A minimal set of generators is called a base of identities of A. Let B be a

Let F be a field of characteristic zero and let E be the Grassmann algebra of an infinite dimensional F-vector space L. In this paper we study the Z 2 -graded polynomial identities of E with respect to any fixed Z 2 -grading such that L is an homogeneous subspace. We found explicit generators for th

Using the trivial observation that one can get polynomial identities on \(R\) from the ones of \(M_{k}(R)\) we derive from the Amitsur-Levitzki theorem a subset of the identities on \(n \times n\) matrices, obtained recently by Szigeti, Tuza, and Révész starting from directed Eulerian graphs, which