Gradings, graded identities, *-identities and graded *-identities of an algebra of upper triangular matrices
Abstract
Let K X be the free associative algebra freely generated over the field K by the countable set X = \x1, x2, …\. If A is an associative K-algebra, we say that a polynomial f(x1,…, xn) ∈ K X is a polynomial identity, or simply an identity in A if f(a1,…, an) = 0 for every a1, …, an ∈ A. Consider A the subalgebra of UT3(K) given by: \[ A = K(e1,1 + e3,3) Ke2,2 Ke2,3 Ke3,2 Ke1,3 , \] where ei,j denote the matrix units. We investigate the gradings on the algebra A, determined by an abelian group, and prove that these gradings are elementary. Furthermore, we compute a basis for the Z2-graded identities of A, and also for the Z2-graded identities with graded involution. Moreover, we describe the cocharacters of this algebra.
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