Norm one tori and Hasse norm principle

Abstract

Let k be a field and T be an algebraic k-torus. In 1969, over a global field k, Voskresenskii proved that there exists an exact sequence 0 A(T) H1(k, Pic\,X) Sha(T) 0 where A(T) is the kernel of the weak approximation of T, Sha(T) is the Shafarevich-Tate group of T, X is a smooth k-compactification of T, X=X×kk, Pic\,X is the Picard group of X and stands for the Pontryagin dual. On the other hand, in 1963, Ono proved that for the norm one torus T=R(1)K/k(Gm) of K/k, Sha(T)=0 if and only if the Hasse norm principle holds for K/k. First, we determine H1(k, Pic\, X) for algebraic k-tori T up to dimension 5. Second, we determine H1(k, Pic\, X) for norm one tori T=R(1)K/k(Gm) with [K:k]=n≤ 15 and n≠ 12. We also show that H1(k, Pic\, X)=0 for T=R(1)K/k(Gm) when the Galois group of the Galois closure of K/k is the Mathieu group Mn≤ Sn with n=11,12,22,23,24. Third, we give a necessary and sufficient condition for the Hasse norm principle for K/k with [K:k]=n≤ 15 and n≠ 12. As applications of the results, we get the group T(k)/R of R-equivalence classes over a local field k via Colliot-Th\'el\`ene and Sansuc's formula and the Tamagawa number τ(T) over a number field k via Ono's formula τ(T)=|H1(k,T)|/|Sha(T)|.