Z2-graded polynomial identities for the Jordan algebra of 2× 2 upper triangular matrices

Abstract

Let K be a field (finite or infinite) of char(K)≠ 2 and let UTn=UTn(K) be the n× n upper triangular matrix algebra over K. If · is the usual product on UTn then with the new product a b=(1/2)(a· b +b· a) we have that UTn is a Jordan algebra, denoted by UJn=UJn(K). In this paper, we describe the set of all Z2-graded polynomial identities of UJ2 with any nontrivial Z2-grading. Moreover, we describe a linear basis for the corresponding relatively free Z2-graded algebra.