Selectivity in Quaternion Algebras

Abstract

We prove an integral version of the classical Albert-Brauer-Hasse-Noether theorem regarding quaternion algebras over number fields. Let A be a quaternion algebra over a number field K and assume that A satisfies the Eichler condition; that is, there exists an archimedean prime of K which does not ramify in A. Let be a commutative, quadratic OK-order and let R⊂ A be an order of full rank. Assume that there exists an embedding of into R. We describe a number of criteria which, if satisfied, imply that every order in the genus of R admits an embedding of . In the case that the relative discriminant ideal of is coprime to the level of R and the level of R is coprime to the discriminant of A, we give necessary and sufficient conditions for an order in the genus of R to admit an embedding of . We explicitly parameterize the isomorphism classes of orders in the genus of R which admit an embedding of . In particular, we show that the proportion of the genus of R admitting an embedding of is either 0, 1/2 or 1. Analogous statements are proven for optimal embeddings.