Division by 1-ζ on superelliptic curves and jacobians

Abstract

In 2016, Yuri Zarhin gave formulas for "dividing a point on a hyperelliptic curve by 2." Given a point P on a hyperelliptic curve C, Zarhin gives the Mumford's representation of every degree g divisor D such that 2(D - g ∞) P - ∞. The aim of this paper is to generalize Zarhin's result to the superelliptic situation; instead of dividing by 2, we divide by 1 - ζ. Even though there is no Mumford's representation for superelliptic curves, we give a formula for functions which cut out D.