Topics on Smooth Commutative Algebra
Abstract
We present, in the same vein as in [20] and [21], some results of the so-called "Smooth (or ) Commutative Algebra", a version of Commutative Algebra of rings instead of ordinary commutative unital rings, looking for similar results to those one finds in the latter, and expanding some others presented in [20]. We give an explicit description of an adjunction between the categories and , in order to study this "bridge". We present and prove many properties of the analog of the radical of an ideal of a ring (namely, the -radical of an ideal), saturation (which we define as "smooth saturation", inspired by [13]), rings of fractions (-rings of fractions, defined first by I. Moerdijk and G. Reyes in [20]), local rings (local -rings), reduced rings (-reduced -rings) and others. We also state and prove new results, such as ad hoc "Separation Theorems", similar to the ones we find in Commutative Algebra, and a stronger version (Theorem 6) of the Theorem 1.4 of [20], characterizing every -ring of fractions. We describe the fundamental concepts of Order Theory for -rings, proving that every -ring is semi-real, and we prove an important result on the strong interplay between the smooth Zariski spectrum and the real smooth spectrum of a -ring.
Cite
@article{arxiv.1904.02725,
title = {Topics on Smooth Commutative Algebra},
author = {Jean Cerqueira Berni and Hugo Luiz Mariano},
journal= {arXiv preprint arXiv:1904.02725},
year = {2020}
}