Weierstrass semigroups from cyclic covers of hyperelliptic curves
Abstract
The Weierstrass semigroup of pole orders of meromorphic functions in a point p of a smooth algebraic curve C is a classical object of study; a celebrated problem of Hurwitz is to characterize which semigroups S ⊂ N with finite complement are realizable as Weierstrass semigroups S= S(C,p). In this note, we establish realizability results for cyclic covers π: (C,p) → (B,q) of hyperelliptic targets B marked in hyperelliptic Weierstrass points; and we show that realizability is dictated by the behavior under j-fold multiplication of certain divisor classes in hyperelliptic Jacobians naturally associated to our cyclic covers, as j ranges over all natural numbers.
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