Root numbers for twisted Fermat quotient curves II

Abstract

This is a sequel to the previous work of the author Yanagihara (2025). Let be an odd prime, let N ≥ 1 be an integer, and let δ ≥ 1 be an N-th-power-free integer. Let r,s,t>0 be integers satisfying r+s+t=N. In Yanagihara (2025), the author computed the root number of the Fermat quotient curve y^N=xr(δ-x)s under the assumptions that rst and that ord(δ)=0 or ord(δ). In this paper, we study the case where the technical assumption rst is dropped. As one such case, we compute the root number when N-1\| r and stδ.