Torsion Points of order 2g+1 on odd degree hyperelliptic curves of genus g

Abstract

Let K be an algebraically closed field of characteristic different from 2, g a positive integer, f(x)∈ K[x] a degree 2g+1 monic polynomial without repeated roots, Cf: y2=f(x) the corresponding genus g hyperelliptic curve over K, and J the jacobian of Cf. We identify Cf with the image of its canonical embedding into J (the infinite point of Cf goes to the zero of group law on J). It is known (arXiv:1809.03061 [math.AG]) that if g>1 then Cf(K) does not contain torsion points, whose order lies between 3 and 2g. In this paper we study torsion points of order 2g+1 on Cf(K). Despite the striking difference between the cases of g=1 and g> 1, some of our results may be viewed as a generalization of well-known results about points of order 3 on elliptic curves. E.g., if p=2g+1 is a prime that coincides with char(K), then every odd degree genus g hyperelliptic curve contains, at most, two points of order p. If g is odd and f(x) has real coefficients, then there are, at most, two real points of order 2g+1 on Cf. If f(x) has rational coefficients and g<52, then there are, at most, two rational points of order 2g+1 on Cf. (However, there are exist genus 52 hyperelliptic curves over the field of rational numbers that have, at least, four rational points of order 105.)