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- Connected_ring abstract "In mathematics, especially in the field of commutative algebra, a connected ring is a commutative ring A that satisfies one of the following equivalent conditions: A possesses no non-trivial (that is, not equal to 1 or 0) idempotent elements; the spectrum of A with the Zariski topology is a connected space.↑".
- Connected_ring wikiPageID "23169183".
- Connected_ring wikiPageLength "1230".
- Connected_ring wikiPageOutDegree "14".
- Connected_ring wikiPageRevisionID "649276421".
- Connected_ring wikiPageWikiLink Algebraic_geometry.
- Connected_ring wikiPageWikiLink Category:Commutative_algebra.
- Connected_ring wikiPageWikiLink Category:Ring_theory.
- Connected_ring wikiPageWikiLink Commutative_algebra.
- Connected_ring wikiPageWikiLink Commutative_ring.
- Connected_ring wikiPageWikiLink Connected_scheme.
- Connected_ring wikiPageWikiLink Connected_space.
- Connected_ring wikiPageWikiLink Glossary_of_algebraic_geometry.
- Connected_ring wikiPageWikiLink Idempotent_element.
- Connected_ring wikiPageWikiLink Integral_domain.
- Connected_ring wikiPageWikiLink Irreducible_ring.
- Connected_ring wikiPageWikiLink Local_ring.
- Connected_ring wikiPageWikiLink Mathematics.
- Connected_ring wikiPageWikiLink Spectrum_of_a_ring.
- Connected_ring wikiPageWikiLink Zariski_topology.
- Connected_ring wikiPageWikiLinkText "connected ring".
- Connected_ring hasPhotoCollection Connected_ring.
- Connected_ring wikiPageUsesTemplate Template:Abstract-algebra-stub.
- Connected_ring wikiPageUsesTemplate Template:Citation.
- Connected_ring wikiPageUsesTemplate Template:Reflist.
- Connected_ring wikiPageUsesTemplate Template:Sfn.
- Connected_ring subject Category:Commutative_algebra.
- Connected_ring subject Category:Ring_theory.
- Connected_ring hypernym Ring.
- Connected_ring type AnatomicalStructure.
- Connected_ring comment "In mathematics, especially in the field of commutative algebra, a connected ring is a commutative ring A that satisfies one of the following equivalent conditions: A possesses no non-trivial (that is, not equal to 1 or 0) idempotent elements; the spectrum of A with the Zariski topology is a connected space.↑".
- Connected_ring label "Connected ring".
- Connected_ring sameAs m.09gk_7l.
- Connected_ring sameAs Sammanhängande_ring.
- Connected_ring sameAs Q5161412.
- Connected_ring sameAs Q5161412.
- Connected_ring wasDerivedFrom Connected_ring?oldid=649276421.
- Connected_ring isPrimaryTopicOf Connected_ring.