How large is the braid monodromy of low-genus Lefschetz fibrations?

Abstract

Given a genus g smooth Lefschetz fibration π : M S2 with singular locus ⊂eq S2, we describe the subgroup Br(π) of the spherical braid group Mod(S2,) consisting of braids admitting a lift to a fiber-preserving diffeomorphism of M. We develop general methods for showing that the index [Mod(S2,) : Br(π)] is infinite. As an application of our methods, we prove that [Mod(S2,) : Br(π)] = ∞ when g = 1, when π is expressible as a self-fiber sum when g ≥ 2, or when π is a holomorphic genus g = 2 Lefschetz fibration whose vanishing cycles are nonseparating. In the genus g = 1 case, we relate the subgroup Br(π) to the action of Mod(S2,) on the SL2-character variety for S2 and provide an alternate proof of the first application via recent work of Lam--Landesman--Litt.

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