The Hurwitz problem for abelian differentials
Abstract
Fix g ≥ 2. Let t(g) be the maximal order of the translation group among all genus-g abelian differentials. By work of Schlage-Puchta and Weitze-Schmith\"usen, t(g) ≤ 4(g - 1). They also classify the g attaining this bound. We assume g is outside this class. We first prove that either t(g) = (2(m + 1) / m) (g - 1) for some m ∈ N \0\, when regular genus-g origamis exist, or t(g) = 2(g - 1), when they do not exist. In the former case, only some values of m > 1 are realizable; m = 5 is the smallest. The resulting set of genera, those satisfying t(g) = (12/5)(g - 1), contains infinitely long arithmetic progressions. The same holds for any odd prime m congruent to 2 modulo 3. In the latter case, "many" strata of the form H(g - 1, g - 1), H(2kq) or H(k2q), where k ≥ 1 is an integer and q is prime, contain no regular origamis; we derive a complete classification. As an application, we exhibit infinite families of genera g for which t(g) = 2(g - 1): g = p + 1 for prime p ≥ 5; g = p2 + 1 for prime, but not Sophie Germain prime, p; and g = pq + 1, for distinct primes p, q ≥ 5.
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