Form equivalence class Howard-Rubin Number: 14
Statement: Let \(A\) be a subring of a commutative ring \(R\) and\(p\) a prime ideal in \(A\) such that \(p = Rp \cap A\). Then there is aprime ideal \(J\) in \(R\) such that \(p = J \cap A\). Rav [1977] andNote 80.
Howard-Rubin number: 14 AM
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