Irreducibility of Hurwitz spaces
Abstract
Graber, Harris and Starr proved, when n >= 2d, the irreducibility of the Hurwitz space H0d,n(Y) which parametrizes degree d coverings of a smooth, projective curve Y of positive genus, simply branched in n points, with full monodromy group Sd (math.AG/0205056). We sharpen this result and prove that H0d,n(Y) is irreducible if n >= max2,2d-4 and in the case of elliptic Y if n >= max2,2d-6. We extend the result to coverings simply branched in all but one point of the discriminant. Fixing the ramification multiplicities over the special point we prove that the corresponding Hurwitz space is irreducible if the number of simply branched points is >= 2d-2. We study also simply branched coverings with monodromy group different from Sd and when n is large enough determine the corresponding connected components of Hd,n(Y). Our results are based on explicit calculation of the braid moves associated with the standard generators of the n-strand braid group of Y.
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