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- SBI_ring abstract "In algebra, an SBI ring is a ring R (with identity) such that every idempotent of R modulo the Jacobson radical can be lifted to R. The abbreviation SBI was introduced by Irving Kaplansky and stands for \"suitable for building idempotent elements\" (Jacobson 1956, p.53).".
- SBI_ring wikiPageID "37641195".
- SBI_ring wikiPageLength "1343".
- SBI_ring wikiPageOutDegree "13".
- SBI_ring wikiPageRevisionID "674917500".
- SBI_ring wikiPageWikiLink American_Mathematical_Society.
- SBI_ring wikiPageWikiLink Banach_algebra.
- SBI_ring wikiPageWikiLink Category:Ring_theory.
- SBI_ring wikiPageWikiLink Compact_space.
- SBI_ring wikiPageWikiLink Idempotent_element.
- SBI_ring wikiPageWikiLink Irving_Kaplansky.
- SBI_ring wikiPageWikiLink Jacobson_radical.
- SBI_ring wikiPageWikiLink Lift_(mathematics).
- SBI_ring wikiPageWikiLink Local_ring.
- SBI_ring wikiPageWikiLink Modulo_(jargon).
- SBI_ring wikiPageWikiLink Nil_ideal.
- SBI_ring wikiPageWikiLink Ring_(mathematics).
- SBI_ring wikiPageWikiLink Topological_ring.
- SBI_ring wikiPageWikiLinkText "SBI ring".
- SBI_ring wikiPageUsesTemplate Template:Abstract-algebra-stub.
- SBI_ring wikiPageUsesTemplate Template:Citation.
- SBI_ring wikiPageUsesTemplate Template:Harv.
- SBI_ring wikiPageUsesTemplate Template:Reflist.
- SBI_ring subject Category:Ring_theory.
- SBI_ring hypernym R.
- SBI_ring comment "In algebra, an SBI ring is a ring R (with identity) such that every idempotent of R modulo the Jacobson radical can be lifted to R. The abbreviation SBI was introduced by Irving Kaplansky and stands for \"suitable for building idempotent elements\" (Jacobson 1956, p.53).".
- SBI_ring label "SBI ring".
- SBI_ring sameAs Q7388957.
- SBI_ring sameAs m.0ndhfqm.
- SBI_ring sameAs LBI-ring.
- SBI_ring sameAs Q7388957.
- SBI_ring wasDerivedFrom SBI_ring?oldid=674917500.
- SBI_ring isPrimaryTopicOf SBI_ring.