Sally Andria scite author profile

Sally Andria

5Publications

3Citation Statements Received

212Citation Statements Given

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208

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Fluminense Federal University

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A universal tropical Jacobian over $M_g^{\trop}$

Abreu¹,

Andria²,

Pacini³

et al. 2019

Preprint

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We introduce and study polystable divisors on a tropical curve, which are the tropical analogue of polystable torsion-free rank-1 sheaves on a nodal curve. We construct a universal tropical Jacobian over the moduli space of tropical curves of genus g. This space parametrizes equivalence classes of tropical curves of genus g together with a µ-polystable divisor, and can be seen as a tropical counterpart of Caporaso universal Picard scheme. We describe polyhedral decompositions of the Jacobian of a tropical curve via polystable divisors, relating them with other known polyhedral decompositions.

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A universal tropical Jacobian over Mgtrop$M_g^{\rm {trop}}$

Abreu

Andria

Pacini

et al. 2022

Journal of London Math Soc

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We introduce and study polystable divisors on a tropical curve, which are the tropical analogue of polystable torsion‐free rank‐1 sheaves on a nodal curve. We construct a universal tropical Jacobian over the moduli space of tropical curves of genus g$g$. This space parametrizes equivalence classes of tropical curves of genus g$g$ together with a μ$\mu$‐polystable divisor, and can be seen as a tropical counterpart of Caporaso universal Picard scheme. We describe polyhedral decompositions of the Jacobian of a tropical curve via polystable divisors, relating them with other known polyhedral decompositions.

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Abel Maps for nodal curves via tropical geometry

Abreu¹,

Andria²,

Pacini³

2020

Preprint

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Abel Maps for nodal curves via tropical geometry

Abreu¹,

Andria²,

Pacini³

2022

Math. Comp.

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We consider Abel maps for regular smoothing of nodal curves with values in the Esteves compactified Jacobian. In general, these maps are just rational, and an interesting question is to find an explicit resolution. We translate this problem into an explicit combinatorial problem by means of tropical and toric geometry. We show that the solution of the combinatorial problem gives rise to an explicit resolution of the Abel map. We are able to use this technique to construct and study all the Abel maps of degree one. Finally, we write an algorithm, which we implemented in SageMath to compute explicitly the solution of the combinatorial problem which, provided the existence of certain subdivisions of a hypercube, give rise to the resolution of the geometric Abel map.

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Degree-2 Abel maps and hyperelleptic curves

Abreu¹,

Andria²,

Pacini³

2022

Preprint

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In this paper we resolve the degree-2 Abel map for nodal curves. Our results are based on a previous work of the authors reducing the problem of the resolution of the Abel map to a combinatorial problem via tropical geometry. As an application, we characterize when the (symmetrized) degree-2 Abel map is not injective, a property that, for a smooth curve, is equivalent to the curve being hyperelliptic.

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Sally Andria

A universal tropical Jacobian over $M_g^{\trop}$

A universal tropical Jacobian over Mgtrop$M_g^{\rm {trop}}$

Abel Maps for nodal curves via tropical geometry

Abel Maps for nodal curves via tropical geometry

Degree-2 Abel maps and hyperelleptic curves

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