Danny Taboada scite author profile

Danny Taboada

4Publications

3Citation Statements Received

211Citation Statements Given

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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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The moduli space of quasistable spin curves

Abreu¹,

Pacini²,

Taboada³

2020

Preprint

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We study a compactification of the moduli space of theta characteristics, giving a modular interpretation of the geometric points and describing the boundary stratification. This space is different from the moduli space of spin curves. The modular description and the boundary stratification of the new compactification are encoded by a tropical moduli space. We show that this tropical moduli space is a refinement of the moduli space of spin tropical curves. We describe explicitly the induced decomposition of its cones.

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The moduli space of quasistable spin curves

2022

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The Torelli theorem establishes that the Jacobian of a smooth projective curve, together with the polarization provided by the theta divisor, fully characterizes the curve. In the case of nodal curves, there exists a concept known as fine compactified Jacobian. The fine compactified Jacobian of a curve comes with a natural stratification that can be regarded as a poset. Furthermore, this poset is entirely determined by the dual graph of the curve and is referred to as the poset of quasistable divisors on the graph. We present a combinatorial version of the Torelli theorem, which demonstrates that the poset of quasistable divisors of a graph completely determines the biconnected components of the graph (up to contracting separating edges). Moreover, we achieve a natural extension of this theorem to tropical curves.

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Danny Taboada

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

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

The moduli space of quasistable spin curves

The moduli space of quasistable spin curves

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