English

Graded polynomial identities for matrices with the transpose involution

Rings and Algebras 2015-06-03 v1

Abstract

Let GG be a group of order kk. We consider the algebra Mk(C)M_k(\mathbb{C}) of kk by kk matrices over the complex numbers and view it as a crossed product with respect to GG by embedding GG in the symmetric group SkS_k via the regular representation and embedding SkS_k in Mk(C)M_k(\mathbb{C}) in the usual way. This induces a natural GG-grading on Mk(C)M_k(\mathbb{C}) which we call a crossed-product grading. We study the graded *-identities for Mk(C)M_k(\mathbb{C}) equipped with such a crossed-product grading and the transpose involution. To each multilinear monomial in the free graded algebra with involution we associate a directed labeled graph. Use of these graphs allows us to produce a set of generators for the (T,)(T,*)-ideal of identities. It also leads to new proofs of the results of Kostant and Rowen on the standard identities satisfied by skew matrices. Finally we determine an asymptotic formula for the *-graded codimension of Mk(C)M_k(\mathbb{C}).

Keywords

Cite

@article{arxiv.1506.00969,
  title  = {Graded polynomial identities for matrices with the transpose involution},
  author = {Darrell Haile and Michael Natapov},
  journal= {arXiv preprint arXiv:1506.00969},
  year   = {2015}
}

Comments

24 pages, 7 figures

R2 v1 2026-06-22T09:45:59.324Z