A uniform quantitative Manin-Mumford theorem for curves over function fields

“…Now consider applying Lemma 6.12 to the graph G 0 , the divisor (14), and the edge e * ∈ E(G 0 ). The lemma concludes that as a function of the edge-lengths of Γ 0 , the slope of f 0 (equivalently f ) on e * is a nonconstant ratio of polynomials.…”

“…Katz, Rabinoff, and Zureick-Brown [11] used tropical methods to prove a uniform bound on the number of torsion points on an algebraic curve of fixed genus, which satisfy an additional technical constraint on the reduction type. Kühne [13] (in characteristic zero) and Looper, Silverman, and Wilms [14] (in positive characteristic) recently proved uniform bounds on the number of torsion points on an algebraic curve.…”

The tropical Manin-Mumford conjecture

“…Now consider applying Lemma 6.12 to the graph G 0 , the divisor (14), and the edge e * ∈ E(G 0 ). The lemma concludes that as a function of the edge-lengths of Γ 0 , the slope of f 0 (equivalently f ) on e * is a nonconstant ratio of polynomials.…”

“…Katz, Rabinoff, and Zureick-Brown [11] used tropical methods to prove a uniform bound on the number of torsion points on an algebraic curve of fixed genus, which satisfy an additional technical constraint on the reduction type. Kühne [13] (in characteristic zero) and Looper, Silverman, and Wilms [14] (in positive characteristic) recently proved uniform bounds on the number of torsion points on an algebraic curve.…”

The tropical Manin-Mumford conjecture