Title of article
Normalized Brauer Factor Sets, Original Research Article
Author/Authors
Louis H. Rowen، نويسنده , , Paul David Saltman، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1997
Pages
23
From page
446
To page
468
Abstract
We investigate normalized Brauer factor sets of central simple algebras with respect to arbitrary maximal separable subalgebras, and show that they have a cohomological description. As a consequence, a central simple algebra of even degree having a normalized Brauer factor set cannot be a division algebra. An intrinsic equivalent condition is given for a central simple algebra to have a normalized Brauer factor set. Consequently, an algebra has a normalized Brauer factor set if it is a square in the relative Brauer group. The converse holds for index 4, or for symbols, but an example is given of an algebra of index 8 with normalized Brauer factor set, which isnota square in the relative Brauer group. On the other hand, supposeDis a division algebra of odd degree. IfDhas a maximal separable subfieldKwhose Galois groupGsatisfies a certain property (which automatically holds for G odd) thenDcontains an elementafor which tr(a) = tr a2 = tr a − 1 = 0.
Journal title
Journal of Algebra
Serial Year
1997
Journal title
Journal of Algebra
Record number
700664
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