On the uniqueness of the Prym map
Abstract
The classical Prym construction associates to a smooth, genus g complex curve X equipped with a nonzero cohomology class θ ∈ H1(X,Z/2Z), a principally polarized abelian variety (PPAV) Prym(X,θ). Denote the moduli space of pairs (X,θ) by Rg, and let Ah be the moduli space of PPAVs of dimension h. The Prym construction globalizes to a holomorphic map of complex orbifolds Prym: Rg Ag-1. For g≥ 4 and h ≤ g-1, we show that Prym is the unique nonconstant holomorphic map of complex orbifolds F:Rg Ah. This solves a conjecture of Farb. A main component in our proof is a classification of homomorphisms π1orb(Rg) Sp(2h,Z) for h ≤ g-1. This is achieved using arguments from geometric group theory and low-dimensional topology.
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