On Trace Zero Matrices and Commutators
Rings and Algebras
2021-11-10 v1 Commutative Algebra
Abstract
Given any commutative ring , a commutator of two matrices over has trace . In this paper, we study the converse: whether every trace matrix is a commutator. We show that if is a B\'{e}zout domain with algebraically closed quotient field, then every trace matrix is a commutator. We also show that if is a regular ring with large enough Krull dimension relative to , then there exist a trace matrix that is not a commutator. This improves on a result of Lissner by increasing the size of the matrix allowed for a fixed . We also give an example of a Noetherian dimension commutative domain that admits a trace non-commutator for any .
Cite
@article{arxiv.2111.04884,
title = {On Trace Zero Matrices and Commutators},
author = {Makoto Suwama},
journal= {arXiv preprint arXiv:2111.04884},
year = {2021}
}
Comments
35 pages