Form equivalence class Howard-Rubin Number: 1
Statement:
For every Boolean ring \((B,+,\cdot)\) and every \(H \subseteq B\) which is closed under \(+\) there exists a \(\subseteq\)-maximal ideal \(Q\subseteq B\) such that \(H\cap Q=\{0\}\).
Howard-Rubin number: 1 BT
Citations (articles):
Keremedis [1996b]
Some equivalents of \(AC\) in algebra
Connections (notes):
References (books):
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