K-differentials with prescribed singularities

Abstract

We study the local invariants that a meromorphic k-differential on a Riemann surface of genus g ≥ 0 can have for k ≥ 3. These local invariants include the orders of zeros and poles, as well as the k-residues at the poles. We show that for a given pattern of orders of zeros, there exists, with a few exceptions, a primitive holomorphic k-differential having zeros of these orders. In the meromorphic case, for genus g ≥ 1, every expected tuple appears as a configuration of k-residues. On the other hand, for certain strata in genus zero, finitely many tuples (up to simultaneous scaling) do not occur as configurations of k-residues for a k-differential.