English

Graded identities of block-triangular matrices

Rings and Algebras 2020-01-03 v2

Abstract

Let FF be an infinite field and UT(d1,,dn)UT(d_1,\dots, d_n) be the algebra of upper block-triangular matrices over FF. In this paper we describe a basis for the GG-graded polynomial identities of UT(d1,,dn)UT(d_1,\dots, d_n), with an elementary grading induced by an nn-tuple of elements of a group GG such that the neutral component corresponds to the diagonal of UT(d1,,dn)UT(d_1,\dots,d_n). In particular, we prove that the monomial identities of such algebra follow from the ones of degree up to 2n12n-1. Our results generalize for infinite fields of arbitrary characteristic, previous results in the literature which were obtained for fields of characteristic zero and for particular GG-gradings. In the characteristic zero case we also generalize results for the algebra UT(d1,,dn)CUT(d_1,\dots, d_n)\otimes C with a tensor product grading, where CC is a color commutative algebra generating the variety of all color commutative algebras.

Keywords

Cite

@article{arxiv.1504.04238,
  title  = {Graded identities of block-triangular matrices},
  author = {Diogo Diniz Pereira da Silva e Silva and Thiago Castilho de Mello},
  journal= {arXiv preprint arXiv:1504.04238},
  year   = {2020}
}

Comments

24 pages and 39 references. We have added section 5 in the text about tensor products by color commutative superalgebras

R2 v1 2026-06-22T09:17:18.804Z