Computation of \(K_ 2\mathbb{Z}[\frac{1+\sqrt{-35}}{2}]\)
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Publication:1909410
zbMath0851.19002MaRDI QIDQ1909410
Publication date: 20 May 1996
Published in: Chinese Annals of Mathematics. Series B (Search for Journal in Brave)
Quadratic extensions (11R11) (K)-theory of global fields (11R70) Symbols and arithmetic ((K)-theoretic aspects) (19F15)
Related Items (7)
On the tame kernels of imaginary cyclic quartic fields with class number one ⋮ The tame kernel of imaginary quadratic fields with class number 2 or 3 ⋮ The tame kernel of $\mathbb {Q}(\zeta _{5})$ is trivial ⋮ The shortest vector problem and tame kernels of cyclotomic fields ⋮ Tame and wild kernels of quadratic imaginary number fields ⋮ Computing the tame kernel of quadratic imaginary fields ⋮ Computation of \(K_ 2\) for the ring of integers of quadratic imaginary fields.
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