Relative spinor class fields: A counterexample

Arenas-Carmona, L

Abstract

It is known that classes of indefinite quadratic forms in a genus are classified by the Galois group of a spinor class field [4]. Hsia has proved the existence of a representation field F with the property that a lattice in the genus represents a fixed given lattice if and only if the corresponding element of the Galois group is trivial on F. Spinor class fields can also be used to classify conjugacy classes of maximal orders in a central simple algebra. In [1] we left open the issue of whether for every fixed given non-maximal order in a central simple division algebra there exists a representation field L with the property that embeds into a given maximal order if and only if the corresponding element of the Galois group is trivial on L. In this work we give a negative answer to this question for central simple division algebras of dimension ≥ 32. The case of non-division algebras is also treated by replacing the phrase embeds into by is contained in a conjugate of. As a byproduct of the techniques used in this paper we compute the representation field of an Eichler order in a quaternion algebra. © 2008 Birkhäuser Verlag Basel/Switzerland.

Más información

Título según WOS: Relative spinor class fields: A counterexample
Título según SCOPUS: Relative spinor class fields: A counterexample
Título de la Revista: ARCHIV DER MATHEMATIK
Volumen: 91
Número: 6
Editorial: SPRINGER BASEL AG
Fecha de publicación: 2008
Página de inicio: 486
Página final: 491
Idioma: English
URL: http://link.springer.com/10.1007/s00013-008-2823-5
DOI:

10.1007/s00013-008-2823-5

Notas: ISI, SCOPUS