About: Ascending chain condition on principal ideals

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In abstract algebra, the ascending chain condition can be applied to the posets of principal left, principal right, or principal two-sided ideals of a ring, partially ordered by inclusion. The ascending chain condition on principal ideals (abbreviated to ACCP) is satisfied if there is no infinite strictly ascending chain of principal ideals of the given type (left/right/two-sided) in the ring, or said another way, every ascending chain is eventually constant.

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rdfs:label	Ascending chain condition on principal ideals (en) 主イデアルに関する昇鎖条件 (ja)
rdfs:comment	抽象代数学において、昇鎖条件は包含関係による半順序が入った環の主左、主右、あるいは主両側イデアルの半順序集合に適用することができる。主イデアルに関する昇鎖条件 (ascending chain condition on principal ideals) （ACCP と省略される）が満たされるとは、環において与えられたタイプ（左／右／両側）の主イデアルの真の無限昇鎖が存在しないということである。あるいは別の言い方をすれば、すべての昇鎖はやがて一定になる。片割れである降鎖条件もまたこれらの半順序集合に適用することができるが、しかし用語 "DCCP" の必要は現在は全くない、なぜならばそのような環は既に左あるいは右完全環という名前がついているからである。（下のの節を参照。）ネーター環（例えば主イデアル整域）は典型的な例であるが、いくつかの重要な非ネーター環、特に一意分解整域と左または右完全環もまた (ACCP) を満たす。 (ja) In abstract algebra, the ascending chain condition can be applied to the posets of principal left, principal right, or principal two-sided ideals of a ring, partially ordered by inclusion. The ascending chain condition on principal ideals (abbreviated to ACCP) is satisfied if there is no infinite strictly ascending chain of principal ideals of the given type (left/right/two-sided) in the ring, or said another way, every ascending chain is eventually constant. (en)
dcterms:subject	Ideals (ring theory)
Wikipage page ID	22243102 (xsd:integer)
Wikipage revision ID	1063305291 (xsd:integer)
Link from a Wikipage to another Wikipage	Principal ideal Principal ideal domain Ideals (ring theory) Hyman Bass Integral domain Noetherian ring Multiplicatively closed subset GCD domain Irreducible element Euclid's lemma Unique factorization domain Prime element Ring (mathematics) Atomic domain Abstract algebra Ascending chain condition Bézout domain Poset Idempotence Inclusion (set theory) Field of fractions Perfect ring Springer-Verlag Descending chain condition Dedekind finite ring
Link from a Wikipage to an external page	http://hjm.math.unizh.ch/v001n1/0131NAGATA.pdf
sameAs	Ascending chain condition on principal ideals Ascending chain condition on principal ideals Ascending chain condition on principal ideals Ascending chain condition on principal ideals Ascending chain condition on principal ideals
dbp:wikiPageUsesTemplate	dbt:Citation dbt:Dead_link dbt:Harv dbt:Reflist dbt:Section_link
bot	InternetArchiveBot (en)
date	July 2017 (en)
fix-attempted	yes (en)
has abstract	In abstract algebra, the ascending chain condition can be applied to the posets of principal left, principal right, or principal two-sided ideals of a ring, partially ordered by inclusion. The ascending chain condition on principal ideals (abbreviated to ACCP) is satisfied if there is no infinite strictly ascending chain of principal ideals of the given type (left/right/two-sided) in the ring, or said another way, every ascending chain is eventually constant. The counterpart descending chain condition may also be applied to these posets, however there is currently no need for the terminology "DCCP" since such rings are already called left or right perfect rings. (See below.) Noetherian rings (e.g. principal ideal domains) are typical examples, but some important non-Noetherian rings also satisfy (ACCP), notably unique factorization domains and left or right perfect rings. (en) 抽象代数学において、昇鎖条件は包含関係による半順序が入った環の主左、主右、あるいは主両側イデアルの半順序集合に適用することができる。主イデアルに関する昇鎖条件 (ascending chain condition on principal ideals) （ACCP と省略される）が満たされるとは、環において与えられたタイプ（左／右／両側）の主イデアルの真の無限昇鎖が存在しないということである。あるいは別の言い方をすれば、すべての昇鎖はやがて一定になる。片割れである降鎖条件もまたこれらの半順序集合に適用することができるが、しかし用語 "DCCP" の必要は現在は全くない、なぜならばそのような環は既に左あるいは右完全環という名前がついているからである。（下のの節を参照。）ネーター環（例えば主イデアル整域）は典型的な例であるが、いくつかの重要な非ネーター環、特に一意分解整域と左または右完全環もまた (ACCP) を満たす。 (ja)
prov:wasDerivedFrom	wikipedia-en:Ascending_chain_condition_on_principal_ideals?oldid=1063305291&ns=0
page length (characters) of wiki page	6578 (xsd:nonNegativeInteger)
foaf:isPrimaryTopicOf	wikipedia-en:Ascending_chain_condition_on_principal_ideals
is Link from a Wikipage to another Wikipage of	Principal ideal domain Noetherian ring GCD domain Euclid's lemma Germ (mathematics) Unique factorization domain ACCP Atomic domain Ascending chain condition for principal ideals Nagata criterion
is Wikipage redirect of	Ascending chain condition for principal ideals Nagata criterion
is Wikipage disambiguates of	ACCP
is foaf:primaryTopic of	wikipedia-en:Ascending_chain_condition_on_principal_ideals

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