Ring theory in o-minimal structures
Abstract
We develop a general ring theory in the o-minimal setting culminating in a description of all the definable rings in an arbitrary o-minimal structure. We show that every definably connected ring with non-trivial multiplication defines an infinite field and it is essentially semialgebraic. A surprisingly strong correspondence between definably connected rings and finite-dimensional associative -algebras is established. Every ideal of a definable unital ring is definable, from which it follows that every definable unital ring is Artinian and Noetherian. If a definable ring is not unital, we give necessary and sufficient conditions for to embed in a definable unital ring as an ideal. Moreover, when this is the case, we provide the smallest such definable unital ring , its definable unitazation.
Cite
@article{arxiv.2503.02215,
title = {Ring theory in o-minimal structures},
author = {Annalisa Conversano},
journal= {arXiv preprint arXiv:2503.02215},
year = {2025}
}
Comments
Early draft. Introduction and references mostly missing