Krull's Principal Ideal Theorem in non-Noetherian settings
Abstract
Let P be a finitely generated ideal of a commutative ring R. Krull's Principal Ideal Theorem states that if R is Noetherian and P is minimal over a principal ideal of R, then P has height at most one. Straightforward examples show that this assertion fails if R is not Noetherian. We consider what can be asserted in the non-Noetherian case in place of Krull's theorem.
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