Hasse norm principle for Heisenberg extensions of degree p3

Abstract

Let k be a global field and p be an odd prime number. We give a necessary and sufficient condition for the Hasse norm principle for separable field extensions K/k, i.e. the determination of the Shafarevich-Tate group Sha(T) of the norm one tori T=R(1)K/k(Gm) of K/k, with [K:k]=p3 or p2 when the Galois group of the Galois closure of K/k is the Heisenberg group Ep(p3) (Cp)2 Cp of order p3, i.e. the extraspecial group of order p3 with exponent p. As a consequence, we get the Tamagawa number τ(T)=p2, p or 1 via Ono's formula τ(T)=|H1(k,T)|/|Sha(T)|.

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