Graded identities of matrix algebras and the universal graded algebra

Abstract

We consider fine G-gradings on Mn(C) (i.e. gradings of the matrix algebra over the complex numbers where each component is 1 dimensional). Groups which provide such a grading are known to be solvable. We consider the T-ideal of G-graded identities and show that it is generated by a special type of binomial identities which we call elementary. In particular we show that the ideal of graded identities is finitely generated as a T-ideal. Next, given such grading we construct a universal algebra UG,c in two different ways: one by means of polynomial identities and the other one by means of a generic two-cocycle (this parallels the classical constructions in the non-graded case). We show that a suitable central localization of UG,c is Azumaya over its center and moreover, its homomorphic images are precisely the G-graded forms of Mn(C). Finally, we consider the ring of central quotients Q(UG,c) (this is an F-central simple algebra where F=Frac(Z) and Z is the center of of UG,c). Using an earlier results of the authors (see E. Aljadeff, D. Haile and M. Natapov, Projective bases of division algebras and groups of central type, Israel J. Math.146 (2005) 317-335 and M. Natapov arXiv:0710.5468v1 [math.RA]) we show that this is a division algebra for a very explicit (and short) family of nilpotent groups. As a consequence, for groups G such that Q(UG,c) is not a division algebra, one can find a non identity polynomial p(xi,g) such that p(xi,g)r is a graded identity for some integer r. We illustrate this phenomenon with a fine G-grading of M6(C) where G is a semidirect product of S3 and C6.