Peter Koymans, Nick Rome
Published 2023-01-24Version 1
Let $A$ be a finite, abelian group. We show that the density of $A$-extensions satisfying the Hasse norm principle exists, when the extensions are ordered by discriminant. This strengthens earlier work of Frei--Loughran--Newton \cite{FLN}, who obtained a density result under the additional assumption that $A/A[\ell]$ is cyclic with $\ell$ denoting the smallest prime divisor of $\# A$.
Comments: 8 pages, comments welcome!
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Weak approximation on the norm one torus
The Hasse norm principle for abelian extensions -- corrigendum
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