Arithmetical ring

In algebra, a commutative ring R is said to be arithmetical (or arithmetic) if any of the following equivalent conditions hold:

1. The localization ${\displaystyle R_{𝔪}}$ of R at ${\displaystyle 𝔪}$ is a uniserial ring for every maximal ideal ${\displaystyle 𝔪}$ of R.
2. For all ideals ${\displaystyle 𝔞,𝔟}$, and ${\displaystyle 𝔠}$,

   ${\displaystyle 𝔞\cap (𝔟+𝔠)=(𝔞\cap 𝔟)+(𝔞\cap 𝔠)}$

3. For all ideals ${\displaystyle 𝔞,𝔟}$, and ${\displaystyle 𝔠}$,

   ${\displaystyle 𝔞+(𝔟\cap 𝔠)=(𝔞+𝔟)\cap (𝔞+𝔠)}$

The last two conditions both say that the lattice of all ideals of R is distributive.

An arithmetical domain is the same thing as a Prüfer domain.

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