Critical Points of Toroidal Bely Maps

Abstract

A Belyi map β: P1(C) P1(C) is a rational function with at most three critical values; we may assume these values are \ 0, \, 1, \, ∞ \. Replacing P1 with an elliptic curve E: \ y2 = x3 + A \, x + B, there is a similar definition of a Belyi map β: E(C) P1(C). Since E(C) T2( R) is a torus, we call (E, β) a Toroidal Belyi pair. There are many examples of Belyi maps β: E(C) P1(C) associated to elliptic curves; several can be found online at LMFDB. Given such a Toroidal Belyi map of degree N, the inverse image G = β-1 ( \ 0, \, 1, \, ∞ \ ) is a set of N elements which contains the critical points of the Belyi map. In this project, we investigate when G is contained in E(C)tors. This is work done as part of the Pomona Research in Mathematics Experience (NSA H98230-21-1-0015).

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