The classical Prym construction associates to a smooth, genus $g$ complex curve $X$ equipped with a nonzero cohomology class $\theta \in H^1(X,\mathbb{Z}/2\mathbb{Z})$, a principally polarized abelian variety (PPAV) $\mbox{Prym}(X,\theta)$. Denote the moduli space of pairs $(X,\theta)$ by $\mathcal{R}_g$, and let $\mathcal{A}_h$ be the moduli space of PPAVs of dimension $h$. The Prym construction globalizes to a holomorphic map of complex orbifolds $\mbox{Prym}: \mathcal{R}_g \to \mathcal{A}_{g-1}$. For $g\geq 4$ and $h \leq g-1$, we show that $\mbox{Prym}$ is the unique nonconstant holomorphic map of complex orbifolds $F:\mathcal{R}_g \to \mathcal{A}_h$. This solves a conjecture of Farb. A main component in our proof is a classification of...
Abstract. Given a tame Galois branched cover of curves π: X → Y with any finite Galois group G whose...
ABSTRACT. We establish a structure result for the universal abelian variety over A5. This implies th...
AbstractStarting from a beautiful idea of Kanev, we construct a uniformization of the moduli space?6...
These are introductory notes to the theory of Prym varieties. Subsequently, we focus on the descript...
Prym varieties provide a correspondence between the moduli spaces of curves and abelian varieties Mg...
The main purpose of this paper is to present a conceptual approach to understanding the extension of...
A conic fibration has an associated sheaf of even Clifford algebra on the base. In this paper, we st...
If Σ is a smooth genus two curve, Σ ⊂ Pic1(Σ) the Abel em-bedding in the degree one Picard variety, ...
Let p:C-->Y be a covering of smooth, projective curves which is a composition of \pi:C-->C'' of degr...
The moduli space Ag of principally polarized abelian varieties of genus g is defined over Z and admi...
Let (P,Ξ) be the naturally polarized model of the Prym variety associated to the étale double cover...
For an Abel-Prym curve contained in a Prym variety, we determine the cohomological support loci of i...
22 pages, applications to topological mirror symmetry and a result of Harder--Narasimhan are addedIn...
The space of Hodge cycles of the general Prym variety is proved to be generated by its Neron-Severi ...
We study the ramified Prym map $\mathscr{P}_{g, r} \rightarrow \mathscr{A}_{g-1+\frac{r}{2}}^\delta$...
Abstract. Given a tame Galois branched cover of curves π: X → Y with any finite Galois group G whose...
ABSTRACT. We establish a structure result for the universal abelian variety over A5. This implies th...
AbstractStarting from a beautiful idea of Kanev, we construct a uniformization of the moduli space?6...
These are introductory notes to the theory of Prym varieties. Subsequently, we focus on the descript...
Prym varieties provide a correspondence between the moduli spaces of curves and abelian varieties Mg...
The main purpose of this paper is to present a conceptual approach to understanding the extension of...
A conic fibration has an associated sheaf of even Clifford algebra on the base. In this paper, we st...
If Σ is a smooth genus two curve, Σ ⊂ Pic1(Σ) the Abel em-bedding in the degree one Picard variety, ...
Let p:C-->Y be a covering of smooth, projective curves which is a composition of \pi:C-->C'' of degr...
The moduli space Ag of principally polarized abelian varieties of genus g is defined over Z and admi...
Let (P,Ξ) be the naturally polarized model of the Prym variety associated to the étale double cover...
For an Abel-Prym curve contained in a Prym variety, we determine the cohomological support loci of i...
22 pages, applications to topological mirror symmetry and a result of Harder--Narasimhan are addedIn...
The space of Hodge cycles of the general Prym variety is proved to be generated by its Neron-Severi ...
We study the ramified Prym map $\mathscr{P}_{g, r} \rightarrow \mathscr{A}_{g-1+\frac{r}{2}}^\delta$...
Abstract. Given a tame Galois branched cover of curves π: X → Y with any finite Galois group G whose...
ABSTRACT. We establish a structure result for the universal abelian variety over A5. This implies th...
AbstractStarting from a beautiful idea of Kanev, we construct a uniformization of the moduli space?6...
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