Torsion in the Braid Monodromy of Elliptic Fibrations

Abstract

Given an elliptic fibration π : M S2 with singular locus ⊂eq S2, let Br(π) < Mod(S2,) be the subgroup of the spherical braid group consisting of those braids that lift to a fiber-preserving diffeomorphism of M. We classify the order n = || elements of Br(π) up to conjugacy in Br(π). To do so, we relate these conjugacy classes to special points on the SL2-character variety for (S2,) that correspond naturally to the exceptional elliptic curves C/Z[ω] and C/Z[i] with their associated norms on Z[ω] and Z[i]. We also show that there are no elements of order n-1 or n-2 in Br(π), as there are in Mod(S2,).