Type numbers of locally tiled orders in central simple algebras

Abstract

Let A be a central simple algebra over a number field K with ring of integers OK, such that either the degree of the algebra n 3, or n=2 and A is not a totally definite quaternion algebra. Then strong approximation holds in A, which allows us to describe the genus of an OK-order ⊂ A in terms of idelic quotients of the field K. We consider orders that are tiled at every finite place of K and use the Bruhat-Tits building for SLn(K) to give a geometric description for the local normalizers of . We also give explicit formulas and algorithms to compute the type number of . Our results generalize work of Vign\'eras for orders in higher degree central simple algebras.