On the Generation of the Tame Kernel by
โ
M. Geijsberts
๐
Article
๐
1995
๐
Elsevier Science
๐
English
โ 416 KB
Let \(p\) be an odd prime number and let \(F\) be a number field not containing a primitive \(p\) th root of unity \(\zeta_{p}\). In this paper we show that if \(\left.p\right\}[F: \mathbb{Q}] \cdot \operatorname{disc}(F)\) then the \(p\)-primary part of \(K_{2}\left(C_{F}[1 / p]\right)\) is generat