Noncyclic Division Algebras over Fields of Brauer Dimension One
classification
🧮 math.RA
keywords
divisionalgebraseveryfieldnoncyclicalgebrabrauercomplete
read the original abstract
Let $K$ be a complete discretely valued field of rank one, with residue field $\Q_p$. 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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