Giulio Orecchia
Published 2018-06-14Version 1
N\'eron models of abelian varieties do not necessarily exist if the base $S$ has dimension higher than 1. We introduce a new condition, called toric additivity, on a family of smooth curves having nodal reduction over a normal crossing divisor $D\subset S$. The condition is necessary and sufficient for existence of a N\'eron model of the jacobian of the family; it depends only on the Betti numbers of the dual graphs of the fibres of the family, or on the toric ranks of the fibres of the jacobian.
Comments: 35 pages. Comments are very welcome
Néron models of $Pic^0$ via $Pic^0$
Neron models and Compactified Picard schemes over the moduli stack of stable curves
Galois actions on Neron models of Jacobians
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