Hasse norm principle for metacyclic extensions with trivial Schur multiplier

Abstract

Let k be a global field, K/k be a finite separable field extension and L/k be the Galois closure of K/k with Galois groups G= Gal(L/k) and H= Gal(L/K) G. In 1931, Hasse proved that if G is cyclic, then the Hasse norm principle holds for K/k. We show that if G is metacyclic with trivial Schur multiplier M(G)=0, then H is cyclic and the Hasse norm principle holds for K/k. Some examples of metacyclic, dihedral, quasidihedral, modular, generalized quaternion, extraspecial groups and Z-groups G with trivial Schur multiplier M(G)=0 are given. These provide new examples which the Hasse norm principle hold for non-Galois extensions K/k whose Galois closure is L/k with metacyclic G= Gal(L/k) and M(G)=0.

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