Title of article
Strong Approximation Property for Baer Orderings on *-Fields Original Research Article
Author/Authors
Leung K. H.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1994
Pages
22
From page
1
To page
22
Abstract
Let (D, *) be a *-field with [D: Z(D)] being finite. Our main objective is to show that the space of all Baer orderings (resp. weak *-orderings) of (D, *) satisfies the strong approximation property iff every Baer ordering of (D, *) is in fact a weak *-ordering. This shows that the notions of Baer orderings and weak *-orderings are respectively the "correct" analogues for semiorderings and orderings. We also intro-duce the concept of Baer formally real *-fields and Baer preorderings. We prove that a *-field admits a Baer ordering iff it is Baer formally real. In addition, some new results on weak *-orderings are also discussed.
Journal title
Journal of Algebra
Serial Year
1994
Journal title
Journal of Algebra
Record number
699236
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