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#1 2009-03-31 21:48:18
- GemmaJ1988
- Member
- Registered: 2008-10-08
- Posts: 39
algebra-ideals
I have the following question:
Find all ideals in the principle ideal domain R which contain the given ideal I
Now i know this is probably a really easy question.
Is it just asking me for the rational numbers in
So in this case its just -2
Then the second part of the question is:
In which case is I the maximal ideal of R?
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#2 2009-03-31 23:04:00
- JaneFairfax
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- Registered: 2007-02-23
- Posts: 6,868
Re: algebra-ideals
GemmaJ1988 wrote:
Then the second part of the question is:
In which case is I the maximal ideal of R?
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#3 2009-05-11 18:38:48
- whatismath
- Member
- Registered: 2007-04-10
- Posts: 19
Re: algebra-ideals
I think we don't need to apply the Euclidean Algorithm in
but just apply the fact that is irreducible over .
Just as Jane did. Given
. Ifis an (principal) ideal, . Write .
Since for some .
But is irreducible over
(which is just what we have known long time ago: we cannot factor
with rational coefficients),
so
is either itself or 1. The former is rejectedsince . So . The answers are
itself and .
Yes
is a maximal ideal. There are infinitely many maximal ideals in ,e.g. .
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