Zero-product balanced algebras
Abstract
We say that an algebra is zero-product balanced if and agree modulo tensors of elements with zero-product. This is closely related to but more general than the notion of a zero-product determined algebra of Bre\v{s}ar, Gra\v{s}i\v{c} and Ortega. Every surjective, zero-product preserving map from a zero-product balanced algebra is automatically a weighted epimorphism, and this implies that zero-product balanced algebras are determined by their linear and zero-product structure. Further, the commutator subspace of a zero-product balanced algebra can be described in terms of square-zero elements. We show that a semiprime, commutative algebra is zero-product balanced if and only if it is generated by idempotents. It follows that every commutative, zero-product balanced algebra is spanned by nilpotent and idempotent elements. We deduce a dichotomy for unital, zero-product balanced algebras: They either admit a character or are generated by nilpotents.
Cite
@article{arxiv.2210.07891,
title = {Zero-product balanced algebras},
author = {Eusebio Gardella and Hannes Thiel},
journal= {arXiv preprint arXiv:2210.07891},
year = {2023}
}
Comments
25 pages. This is the published version