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divan
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Characteristic zero field without proper regular Noetherian dense unital subrings

Let $F$ be a field. Call a unital subring $R\subset F$ dense if there is no subfield $K\subsetneq F$ such that $R\subset F$.

Is there a characteristic zero field $F$ such that the only regular Noetherian dense unital subring $R\subset F$ is $F$ itself?

divan
  • 55
  • 3