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This article is cited in 5 scientific papers (total in 5 papers)
Symmetry of Sections in Fields of Formal Power Series and a Non-Standard Real Line
N. Yu. Galanova Tomsk State University
Abstract:
Let $R[[G,\beta]]$ be a field of formal power series with real coefficients, whose supports are well ordered subsets of an Abelian group $G$ of cardinality strictly less than $\beta$. For $R[[G,\beta]]$, we give criteria of a section being symmetric and of a symmetric section being Dedekind. It is proved that an $\alpha^+$-saturated non-standard real line $^{*}R$ is isomorphic to some field of the form $R[[G,\alpha^+]]$. For $^{*}R$, some consequences are inferred regarding symmetric sections, and the cofinality of “banks” of the sections.
Received: 06.12.2000 Revised: 29.06.2002
Citation:
N. Yu. Galanova, “Symmetry of Sections in Fields of Formal Power Series and a Non-Standard Real Line”, Algebra Logika, 42:1 (2003), 26–36; Algebra and Logic, 42:1 (2003), 14–19
Linking options:
https://www.mathnet.ru/eng/al15 https://www.mathnet.ru/eng/al/v42/i1/p26
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