Maps between schematic semi-graded rings
Abstract
Motivated by Smith's work \cite{Smith2003, Smith2016} on maps between non-commu\-tative projective spaces of the form in the setting of non-commutative projective geometry developed by Rosenberg and Van den Bergh, and the notion of schematicness introduced by Van Oystaeyen and Willaert \cite{VanOystaeyenWillaert1995} to -graded rings with the aim of formulating a non-commutative scheme theory \`a la Grothendieck \cite{EGAII1961}, in this paper we consider a first approach to maps in the Smith's sense in the more general setting of non-commutative projective spaces over semi-graded rings defined by Lezama and Latorre \cite{LezamaLatorre2017}. We extend Smith's key result \cite[Theorem 3.2]{Smith2003}, \cite[Theorem 1.2]{Smith2016} from the category of schematic -graded rings to the category of schematic semi-graded rings.
Cite
@article{arxiv.2401.15631,
title = {Maps between schematic semi-graded rings},
author = {Andrés Chacón and María Camila Ramírez and Armando Reyes},
journal= {arXiv preprint arXiv:2401.15631},
year = {2024}
}
Comments
15 pages