Rational points on solvable curves over Q via non-abelian Chabauty

Abstract

We study the Selmer varieties of smooth projective curves of genus at least two defined over Q which geometrically dominate a curve with CM Jacobian. We extend a result of Coates and Kim to show that Kim's non-abelian Chabauty method applies to such a curve. By combining this with results of Bogomolov-Tschinkel and Poonen on unramified correspondences, we deduce that any cover of P1 with solvable Galois group, and in particular any superelliptic curve over Q, has only finitely many rational points over Q.