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- Q5988007 subject Q8234752.
- Q5988007 subject Q8399470.
- Q5988007 subject Q8531868.
- Q5988007 abstract "In commutative algebra, the norm of an ideal is a generalization of a norm of an element in the field extension. It is particularly important in number theory since it measures the size of an ideal of a complicated number ring in terms of an ideal in a less complicated ring. When the less complicated number ring is taken to be the ring of integers, Z, then the norm of a nonzero ideal I of a number ring R is simply the size of the finite quotient ring R/I.".
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- Q5988007 wikiPageWikiLink Q1228885.
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- Q5988007 wikiPageWikiLink Q1358313.
- Q5988007 wikiPageWikiLink Q1493740.
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- Q5988007 wikiPageWikiLink Q254347.
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- Q5988007 wikiPageWikiLink Q5156533.
- Q5988007 wikiPageWikiLink Q5988007.
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- Q5988007 wikiPageWikiLink Q619436.
- Q5988007 wikiPageWikiLink Q727659.
- Q5988007 wikiPageWikiLink Q774579.
- Q5988007 wikiPageWikiLink Q8234752.
- Q5988007 wikiPageWikiLink Q8399470.
- Q5988007 wikiPageWikiLink Q842159.
- Q5988007 wikiPageWikiLink Q8531868.
- Q5988007 wikiPageWikiLink Q912083.
- Q5988007 comment "In commutative algebra, the norm of an ideal is a generalization of a norm of an element in the field extension. It is particularly important in number theory since it measures the size of an ideal of a complicated number ring in terms of an ideal in a less complicated ring. When the less complicated number ring is taken to be the ring of integers, Z, then the norm of a nonzero ideal I of a number ring R is simply the size of the finite quotient ring R/I.".
- Q5988007 label "Ideal norm".