Norm one tori and Hasse norm principle, III: Degree 16 case
Abstract
Let k be a field, T be an algebraic k-torus, X be a smooth k-compactification of T and Pic\,X be the Picard group of X=X×kk where k is a fixed separable closure of k. Hoshi, Kanai and Yamasaki [HKY22], [HKY23] determined H1(k, Pic\, X) for norm one tori T=R(1)K/k(Gm) and gave a necessary and sufficient condition for the Hasse norm principle for extensions K/k of number fields with [K:k]≤ 15. In this paper, we treat the case where [K:k]=16. Among 1954 transitive subgroups G=16Tm≤ S16 (1≤ m≤ 1954) up to conjugacy, we determine 1101 (resp. 774, 31, 37, 1, 1, 9) cases with H1(k, Pic\, X)=0 (resp. Z/2Z, (Z/2Z) 2, (Z/2Z) 3, (Z/2Z) 4, (Z/2Z) 6, Z/4Z) where G is the Galois group of the Galois closure L/k of K/k. We see that H1(k, Pic\, X)=0 implies that the Hasse norm principle holds for K/k. In particular, among 22 primitive G=16Tm cases, i.e. H≤ G=16Tm is maximal with [G:H]=16, we determine exactly 6 cases (m=178, 708, 1080, 1329, 1654, 1753) with H1(k, Pic\, X)≠ 0 ((Z/2Z) 2, Z/2Z, (Z/2Z) 2, Z/2Z, Z/2Z, Z/2Z). Moreover, we give a necessary and sufficient condition for the Hasse norm principle for K/k with [K:k]=16 for 22 primitive G=16Tm cases. As a consequence of the 22 primitive G cases, we get the Tamagawa number τ(T)=1, 1/2, 1/4 of T=R(1)K/k(Gm) over a number field k via Ono's formula τ(T)=1/|Sha(T)| where Sha(T) is the Shafarevich-Tate group of T.
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