Vanishing H1 for Hurwitz spaces of fully-marked admissible covers of degree 3

Abstract

We show that the first cohomology group of the Hurwitz space of fully-marked admissible covers H1(Hd,g(μ)) vanishes for covers of degree d = 3 and deduce the same result for the classical Hurwitz space of simply-branched covers. In degree 4, we compute examples where H1(H4,g(μ)) is nonzero, which implies that H1(Hd,g(μ)) is nonvanishing for d ≥ 4. We describe the stratification of the boundary of Hd,g(μ) by lower-dimensional Hd',g'(μ'), and set up an inductive framework which may be used for future arguments involving the odd cohomology of Hd,g(μ).

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