Curves with few bad primes over cyclotomic Z-extensions

Abstract

Let K be a number field, and S a finite set of non-archimedean places of K, and write OS× for the group of S-units of K. A famous theorem of Siegel asserts that the S-unit equation +δ=1, with , δ ∈ OS×, has only finitely many solutions. A famous theorem of Shafarevich asserts that there are only finitely many isomorphism classes of elliptic curves over K with good reduction outside S. Now instead of a number field, let K=Q∞, which denotes the Z-cyclotomic extension of Q. We show that the S-unit equation +δ=1, with , δ ∈ OS×, has infinitely many solutions for ∈ \2,3,5,7\, where S consists only of the totally ramified prime above . Moreover, for every prime , we construct infinitely many elliptic or hyperelliptic curves defined over K with good reduction away from 2 and . For certain primes we show that the Jacobians of these curves in fact belong to infinitely many distinct isogeny classes.