2020 Help me understand this report
Noncyclic division algebras over fields of Brauer dimension one
Abstract: Let K be a complete discretely valued field of rank one, with residue field Qp. It is well known that period equals index in Br(K). We prove that when p = 2 there exist noncyclic K-division algebras of every 2-power degree divisible by four. Otherwise, every K-division algebra is cyclic.
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