The Kaplansky radical of a quadratic field extension

Karim Johannes Becher; David B. Leep

doi:10.1016/j.jpaa.2013.12.009

The Kaplansky radical of a quadratic field extension

Karim Johannes Becher
, David B. Leep

Mathematics

Producción científica: Article › revisión exhaustiva

1 Cita (Scopus)

Resumen

The radical of a field consists of all nonzero elements that are represented by every binary quadratic form representing 1. Here, the radical is studied in relation to local-global principles, and further in its behavior under quadratic field extensions. In particular, an example of a quadratic field extension is constructed where the natural analogue to the square-class exact sequence for the radical fails to be exact. This disproves a conjecture of Kijima and Nishi.

Idioma original	English
Páginas (desde-hasta)	1577-1582
Número de páginas	6
Publicación	Journal of Pure and Applied Algebra
Volumen	218
N.º	9
DOI	https://doi.org/10.1016/j.jpaa.2013.12.009
Estado	Published - sept 2014

ASJC Scopus subject areas

Algebra and Number Theory

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10.1016/j.jpaa.2013.12.009

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The Kaplansky radical of a quadratic field extension

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