Pages that link to "Item:Q1909410"

The following pages link to Computation of \(K_ 2\mathbb{Z}[\frac{1+\sqrt{-35}}{2}]\) (Q1909410):

Displaying 11 items.

• Finding non-trivial elements in \(K_ 2({\mathcal O}_ F)\) for imaginary quadratic number fields \(F\) (Q1208193) (← links)
• Generalization of Thue's theorem and computation of the group \(K_ 2 O_ F\) (Q1323875) (← links)
• Computation of \(K_ 2\mathbb{Z}[\sqrt {-6}]\) (Q1339391) (← links)
• Computation of \(K_ 2\) for the ring of integers of quadratic imaginary fields. (Q1609690) (← links)
• The shortest vector problem and tame kernels of cyclotomic fields (Q2039518) (← links)
• On the tame kernels of imaginary cyclic quartic fields with class number one (Q2631704) (← links)
• The structure of certain \(K_2O_F\) (Q2721532) (← links)
• The tame kernel of \(\mathbb Q(\zeta_5)\) is trivial (Q2792375) (← links)
• Tame and wild kernels of quadratic imaginary number fields (Q4221979) (← links)
• Computing the tame kernel of quadratic imaginary fields (Q4501046) (← links)
• The tame kernel of imaginary quadratic fields with class number 2 or 3 (Q4806401) (← links)