Let X be a smooth curve defined over the fraction field K of a complete discrete valuation ring R. We study a natural filtration of the special fiber of the Néron model of the Jacobian of X by closed, unipotent subgroup schemes. We show that the jumps in this filtration only depend on the fiber type of the special fiber of the minimal regular model with strict normal crossings for X over R, and in particular are independent of the residue characteristic. Furthermore, we obtain information about where these jumps occur. We also compute the jumps for each of the finitely many possible fiber types for curves of genus 1 and 2
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
Our objects of study are aftine group schemes, finitely presented and flat, over a domain A. As in 1...
We study the integral model of the Drinfeld modular curve X 1(n) for a prime n ∈ Fq [T]. A fu...
Let X be a smooth curve defined over the fraction field K of a complete discrete valuation ring R. W...
This thesis treats various aspects of stable reduction of curves, and consists of two separate paper...
Let O_K be discrete valuation ring with a field of fractions K and a perfect residue field. Let E be...
We investigate Néron models of Jacobians of singular curves over strictly Henselian discretely value...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2016.Cataloged fro...
AbstractKodaira and Néron classified and described the geometry of the special fibers of the Néron m...
Let A be an abelian variety over a discretely valued field. Edixhoven has defined a filtration on th...
In this thesis we give insight into the minimisation problem of genus one curves defined by equation...
AbstractLet f:C→B be a smoothing of a stable curve C and Sf∗ be the moduli space of theta characteri...
Soit E une courbe elliptique sur un corps de valuation discrètecomplet K à corps résiduel algbrique...
Let A be an abelian variety over a discretely valued field. Edixhoven has defined a filtration on th...
Dans cette thèse, on aborde plusieurs questions autour des modèles de Néron de variétés abéliennes s...
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
Our objects of study are aftine group schemes, finitely presented and flat, over a domain A. As in 1...
We study the integral model of the Drinfeld modular curve X 1(n) for a prime n ∈ Fq [T]. A fu...
Let X be a smooth curve defined over the fraction field K of a complete discrete valuation ring R. W...
This thesis treats various aspects of stable reduction of curves, and consists of two separate paper...
Let O_K be discrete valuation ring with a field of fractions K and a perfect residue field. Let E be...
We investigate Néron models of Jacobians of singular curves over strictly Henselian discretely value...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2016.Cataloged fro...
AbstractKodaira and Néron classified and described the geometry of the special fibers of the Néron m...
Let A be an abelian variety over a discretely valued field. Edixhoven has defined a filtration on th...
In this thesis we give insight into the minimisation problem of genus one curves defined by equation...
AbstractLet f:C→B be a smoothing of a stable curve C and Sf∗ be the moduli space of theta characteri...
Soit E une courbe elliptique sur un corps de valuation discrètecomplet K à corps résiduel algbrique...
Let A be an abelian variety over a discretely valued field. Edixhoven has defined a filtration on th...
Dans cette thèse, on aborde plusieurs questions autour des modèles de Néron de variétés abéliennes s...
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
Our objects of study are aftine group schemes, finitely presented and flat, over a domain A. As in 1...
We study the integral model of the Drinfeld modular curve X 1(n) for a prime n ∈ Fq [T]. A fu...