Primeness property for regular gradings
Abstract
Let be an algebraically closed field of characteristic and a finite abelian group. For a -graded -algebra , we define the primeness property for graded central polynomials: for any graded polynomials and in disjoint sets of variables, if is graded central, then both and are graded central. Let be its decomposition into homogeneous components. Assume that for every -tuple in , there exist with , and that for each , there exists a scalar such that . Then the grading is regular, and minimal if no distinct , satisfy for all . We prove that -graded regular algebras, including with the Pauli grading, fail the primeness property. For matrices of orders and , no nontrivial gradings satisfy primeness. Finally, for -graded regular algebras, we use the known fact that minimal regular gradings satisfy the graded identities of the infinite-dimensional Grassmann algebra and contain a copy of to show that such algebras satisfy the primeness property in the ordinary sense. As a consequence, we show that minimality is not required for the regularity of the grading.
Cite
@article{arxiv.2601.05066,
title = {Primeness property for regular gradings},
author = {Lucio Centrone and Claudemir Fideles and Plamen Koshlukov and Kauê Pereira},
journal= {arXiv preprint arXiv:2601.05066},
year = {2026}
}
Comments
21 pages