Graded Polynomial Identities for Matrices with the Transpose Involution over an Infinite Field

Abstract

Let F be an infinite field, and let Mn(F) be the algebra of n× n matrices over F. Suppose that this algebra is equipped with an elementary grading whose neutral component coincides with the main diagonal. In this paper, we find a basis for the graded polynomial identities of Mn(F) with the transpose involution. Our results generalize for infinite fields of arbitrary characteristic previous results in the literature which were obtained for the field of complex numbers and for a particular class of elementary G-gradings.