Torsion points of small order on cyclic covers of P1. II

Abstract

Let d≥ 2 be an integer, K0 a perfect field such that char(K0) does not divide d, n > d an integer prime to d, f(x)∈ K0[x] a degree n monic polynomial without repeated roots, and Cf,d a smooth projective model of the affine curve yd=f(x). Let J(Cf,d) be the Jacobian of the K0-curve Cf,d . We identify Cf,d with its canonical image in J(Cf,d) (such that the infinite point of Cf,d goes to the zero of the group law on J(Cf,d)). We say that an integer m>1 is (n,d)-reachable over K0 if there exists a polynomial f(x) as above such that Cf,d(K0) contains a torsion point of order m. Earlier we proved that if m is (n,d)-reachable, then either m=d or m ≥ n (in addition, both d and n are (n,d)-reachable). In the present paper we prove the following. If n<m<2n and if m is (n,d)-reachable over K0, then either d|m or m n d. If either char(K0)=0 or K0 in infinite and char(K0)>n, then d· [(n+d)/d] is (n,d)-reachable if and only if n-(d-1)· [(n+d)/d] 0. If char(K0)=0, then n+d is (n,d)-reachable if and only if d2-2d<n. If d=2 (the hyperelliptic case) and char(K0)=0, then m is (n,d)-reachable if n+1 m 2n+1. (The case when n m 3(n-1)/2 was done earlier by E.V. Flynn.)

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