The 4-rank of the tame kernel versus the 4-rank of the narrow class group in quadratic number fields
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Publication:4522892
DOI10.4064/AA96-2-4zbMath1052.11079OpenAlexW2046786385MaRDI QIDQ4522892
Publication date: 7 January 2001
Published in: Acta Arithmetica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4064/aa96-2-4
Computations of higher (K)-theory of rings (19D50) (K)-theory of global fields (11R70) Symbols and arithmetic ((K)-theoretic aspects) (19F15) Class groups and Picard groups of orders (11R65)
Related Items (7)
8-ranks of class groups of some imaginary quadratic number fields ⋮ The formula of 8-ranks of tame kernels ⋮ Tame kernels for biquadratic number fields ⋮ Dyadic ideal, class group, and tame kernel in quadratic fields ⋮ The densities of 4-ranks of tame kernels for quadratic fields ⋮ On 2-Sylow Subgroups of Tame Kernels ⋮ On tame kernel and class group in terms of quadratic forms.
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