On the non-commutative endomorphism rings of abelian surfaces

Abstract

A conjecture of Coleman implies that only finitely many quaternion algebras over the rational numbers can be the endomorphism Q-algebras of abelian surfaces over the complex numbers which can be defined over Q. One may think of this as a higher-dimensional version of the Gauss Class Number problem. Before now, no one has ruled out quaternion algebras over Q not already ruled out by the Albert classification. We rule out infinitely many such quaternion algebras by showing that for infinitely many D, the Atkin-Lehner quotient Shimura curve XD/wD has no Q-rational points. Our principal method is to use the level structure maps above XD to create torsors for use in the descent obstruction. Numerous Diophantine and analytic results on Shimura curves are also proved.