Noetherian operators, primary submodules and symbolic powers
Commutative Algebra
2020-02-26 v2 Algebraic Geometry
Abstract
We give an algebraic and self-contained proof of the existence of the so-called Noetherian operators for primary submodules over general classes of Noetherian commutative rings. The existence of Noetherian operators accounts to provide an equivalent description of primary submodules in terms of differential operators. As a consequence, we introduce a new notion of differential powers which coincides with symbolic powers in many interesting non-smooth settings, and so it could serve as a generalization of the Zariski-Nagata Theorem.
Cite
@article{arxiv.1909.07253,
title = {Noetherian operators, primary submodules and symbolic powers},
author = {Yairon Cid-Ruiz},
journal= {arXiv preprint arXiv:1909.07253},
year = {2020}
}
Comments
to appear in Collect. Math