Description: The ring is the (semi)localization of the integers at the multiplicative set of numbers not divisible by either of $2$ and $3$

Notes: Exactly two maximal ideals.

Keywords localization

Reference(s):

- H. C. Hutchins. Examples of commutative rings. (1981) @ Example 105 p 106
- M. Nagata. Local rings. (1962) @ pp 55-56

Known Properties

Legend

- = has the property
- = does not have the property
- = information not in database

Name | Measure | |
---|---|---|

Krull dimension (classical) | 1 |

Name | Description |
---|---|

Idempotents | $\{0,1\}$ |

Nilpotents | $\{0\}$ |

Zero divisors | $\{0\}$ |