On the Visibility category of the Shafarevich--Tate group

Abstract

Given an elliptic curve E over and a nontrivial element σ of its Shafarevich--Tate group (E), we introduce the Visualization category (E; σ) of abelian varieties that ``visualize'' σ in the sense of Mazur, and we study minimal objects in this category. In particular, we show that there can be several minimal visualizing abelian varieties of different dimensions, answering a question of Mazur. We revisit two constructions of visualizing abelian varieties: restriction of scalars (as in the work of Agashe and Stein), and a construction due to de Jong (as in the work of Cremona and Mazur). We show that restriction of scalars typically produces minimal visualizations. When σ has order 2 or 3, we build upon the de Jong construction and make it totally explicit. While the de Jong construction can produce non-minimal objects, an appropriate choice in the construction for order 2 elements σ yields an explicit genus 2 curve whose Jacobian is a minimal visualization. For order 3 elements we apply our algorithmic construction to Fisher's database of such elements, and obtain computational evidence that, in the absence of a 3-isogeny, the de Jong construction yields a minimal visualization.