Definition: A domain $R$ such that for every finite extension $L$ of its quotient field $K$, the integral closure of $R$ in $L$ is a finitely generated A-module. Also known as "Japanese rings"
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Metaproperties:
This property has the following metaproperties
passes to localizations
This property does not have the following metaproperties
stable under products
(Counterexample: $R_{ 57 }$)
forms an equational class
(counterexample needed)
passes to quotient rings
(Counterexample: $R_{ 49 }$ is a homomorphic image of $R_{ 27 }$)