Category:Localization-closed properties of commutative unital rings

This category lists properties $$p$$ of commutative unital rings, such that if $$R$$ has property $$p$$ so does the localization with respect to any prime ideal.

Most of these properties actually satisfy something stronger: they are closed under localization at any multiplicatively closed subset not containing zero.

Related categories

 * Category:Strongly local properties of commutative unital rings