R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m? [closed]

Question

Closed. This question is off-topic. It is not currently accepting answers.

MathOverflow is for mathematicians to ask each other questions about their research. See Math.StackExchange to ask general questions in mathematics.

Closed 10 years ago.

Improve this question

Maybe it is too easy but I want to know that: If $R$ is regular local ring of Krull dimension $2$ and $m$ is the maximal ideal of $R$. (It means that height $m$ is $2$). Can we find any ideal of height $2$ different from $m$?

$\begingroup$ Rolled back a pointless edit of an off-topic question $\endgroup$
– Yemon Choi
Commented Jul 26, 2014 at 13:27 — Yemon Choi, Commented Jul 26, 2014 at 13:27

Graham Leuschke · Accepted Answer · 2012-11-12 01:49:56Z

2

No. Since it is the unique maximal ideal, $\mathfrak m$ contains every prime ideal (its complement is the set of all units of $R$).

answered Nov 12, 2012 at 1:49

Graham Leuschke

5,8462 gold badges29 silver badges37 bronze badges

Add a comment |

Stack Exchange Network

R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m? [closed]

1 Answer 1

Not the answer you're looking for? Browse other questions tagged
ac.commutative-algebra
.

R is regular local rings of Krull dimension 2.Can we find any ideal of height 2 different from m? [closed]

1 Answer 1

Not the answer you're looking for? Browse other questions tagged ac.commutative-algebra.

Related

Not the answer you're looking for? Browse other questions tagged
ac.commutative-algebra
.