Marco Fontana, Evan Houston, Tom Lucas
Published 2006-11-21Version 1
We show that in certain Pr\"ufer domains, each nonzero ideal $I$ can be factored as $I=I^v \Pi$, where $I^v$ is the divisorial closure of $I$ and $\Pi$ is a product of maximal ideals. This is always possible when the Pr\"ufer domain is $h$-local, and in this case such factorizations have certain uniqueness properties. This leads to new characterizations of the $h$-local property in Pr\"ufer domains. We also explore consequences of these factorizations and give illustrative examples.
On completely decomposable and separable modules over Prüfer domains
Toward a classification of prime ideals in Prüfer domains
Commutative rings with every non-maximal ideal finitely generated
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