Thibault Poiret
Published 2021-03-11Version 1
We work with a smooth relative curve $X_U/U$ with nodal reduction over an excellent and locally factorial scheme $S$. We show that blowing up a nodal model of $X_U$ in the ideal sheaf of a section yields a new nodal model, and describe how these models relate to each other. We construct a N\'eron model for the Jacobian of $X_U$, and describe it locally on $S$ as a quotient of the Picard space of a well-chosen nodal model. We provide a combinatorial criterion for the N\'eron model to be separated.
Comments: 37 pages including bibliography. Comments are welcome
A criterion for existence of Néron models of jacobians
Néron models of $Pic^0$ via $Pic^0$
Torsors under tori and Néron models
![QR code for arXiv:2103.06917 [math.AG]](http://oss.arxitics.com/images/favicon.svg)