English

Embedding Orders Into Central Simple Algebras

Number Theory 2010-06-21 v1 Rings and Algebras

Abstract

The question of embedding fields into central simple algebras BB over a number field KK was the realm of class field theory. The subject of embedding orders contained in the ring of integers of maximal subfields LL of such an algebra into orders in that algebra is more nuanced. The first such result along those lines is an elegant result of Chevalley \cite{Chevalley-book} which says that with B=Mn(K)B = M_n(K) the ratio of the number of isomorphism classes of maximal orders in BB into which the ring of integers of LL can be embedded (to the total number of classes) is [LK~:K]1[L \cap \widetilde K : K]^{-1} where K~\widetilde K is the Hilbert class field of KK. Chinburg and Friedman (\cite{Chinburg-Friedman}) consider arbitrary quadratic orders in quaternion algebras satisfying the Eichler condition, and Arenas-Carmona \cite{Arenas-Carmona} considers embeddings of the ring of integers into maximal orders in a broad class of higher rank central simple algebras. In this paper, we consider central simple algebras of dimension p2p^2, pp an odd prime, and we show that arbitrary commutative orders in a degree pp extension of KK, embed into none, all or exactly one out of pp isomorphism classes of maximal orders. Those commutative orders which are selective in this sense are explicitly characterized; class fields play a pivotal role. A crucial ingredient of Chinberg and Friedman's argument was the structure of the tree of maximal orders for SL2SL_2 over a local field. In this work, we generalize Chinburg and Friedman's results replacing the tree by the Bruhat-Tits building for SLpSL_p.

Keywords

Cite

@article{arxiv.1006.3683,
  title  = {Embedding Orders Into Central Simple Algebras},
  author = {Benjamin Linowitz and Thomas R. Shemanske},
  journal= {arXiv preprint arXiv:1006.3683},
  year   = {2010}
}
R2 v1 2026-06-21T15:38:09.395Z