Prüfer domain

A commutative integral domain $R$ is a Prüfer domain if every finitely generated nonzero ideal $I$ of $R$ is invertible.

Let $R_I$ denote the localization of $R$ at $R\backslash I$. Then the following statements are equivalent:

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  i) $R$ is a Prüfer domain.

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  ii) For every prime ideal $P$ in $R$, $R_P$ is a valuation domain.

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  iii) For every maximal ideal $M$ in $R$, $R_M$ is a valuation domain.

A Prüfer domain is a Dedekind domain if and only if it is Noetherian.

If $R$ is a Prüfer domain with quotient field $K$, then any domain $S$ such that $R\subset S\subset K$ is Prüfer.