English

The tropical Abel--Prym map

Algebraic Geometry 2025-08-25 v2

Abstract

We prove that the tropical Abel--Prym map Ψ ⁣:Γ~Prym(Γ~/Γ)\Psi\colon \widetilde\Gamma\to Prym(\widetilde\Gamma/\Gamma) associated with a free double cover π ⁣:Γ~Γ\pi\colon \widetilde\Gamma\to \Gamma of hyperelliptic metric graphs is harmonic of degree 22 in accordance with the already established algebraic result. We then prove a partial converse. Contrary to the analogous algebraic result, when the source graph of the double cover is not hyperelliptic, the Abel--Prym map is often not injective. When the source graph is hyperelliptic, we show that the Abel--Prym graph Ψ(Γ~)\Psi(\widetilde\Gamma) is a hyperelliptic metric graph of genus gΓ1g_{\Gamma}-1 whose Jacobian is isomorphic, as pptav, to the Prym variety of the cover. En route, we count the number of distinct free double covers by hyperelliptic metric graphs.

Keywords

Cite

@article{arxiv.2412.06971,
  title  = {The tropical Abel--Prym map},
  author = {Giusi Capobianco and Yoav Len},
  journal= {arXiv preprint arXiv:2412.06971},
  year   = {2025}
}

Comments

Accepted for publication in Algebraic Combinatorics after major revisions. The statements and proofs of the main theorems have been revised. A new theorem C has been introduced that relates the tropical Abel--Prym map with the tropical bigonal construction. 36 pages, 14 figures

R2 v1 2026-06-28T20:28:38.718Z