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- Jacobson_ring abstract "In algebra, a Hilbert ring or a Jacobson ring is a ring such that every prime ideal is an intersection of primitive ideals. For commutative rings primitive ideals are the same as maximal ideals so in this case a Jacobson ring is one in which every prime ideal is an intersection of maximal ideals. Jacobson rings were introduced independently by Krull (1951, 1952), who named them after Nathan Jacobson because of their relation to Jacobson radicals, and by Goldman (1951), who named them Hilbert rings after David Hilbert because of their relation to Hilbert's Nullstellensatz.".
- Jacobson_ring wikiPageExternalLink ICM1950.2.
- Jacobson_ring wikiPageExternalLink 2033240.
- Jacobson_ring wikiPageID "4607512".
- Jacobson_ring wikiPageRevisionID "606445904".
- Jacobson_ring authorlink "Wolfgang Krull".
- Jacobson_ring book "4".
- Jacobson_ring hasPhotoCollection Jacobson_ring.
- Jacobson_ring last "Krull".
- Jacobson_ring pages "section 10".
- Jacobson_ring year "1951".
- Jacobson_ring year "1952".
- Jacobson_ring subject Category:Commutative_algebra.
- Jacobson_ring subject Category:Ring_theory.
- Jacobson_ring comment "In algebra, a Hilbert ring or a Jacobson ring is a ring such that every prime ideal is an intersection of primitive ideals. For commutative rings primitive ideals are the same as maximal ideals so in this case a Jacobson ring is one in which every prime ideal is an intersection of maximal ideals.".
- Jacobson_ring label "Anneau de Jacobson".
- Jacobson_ring label "Jacobson ring".
- Jacobson_ring label "Jacobson-ring".
- Jacobson_ring sameAs Anneau_de_Jacobson.
- Jacobson_ring sameAs Jacobson-ring.
- Jacobson_ring sameAs m.0ccbrw.
- Jacobson_ring sameAs Q2620920.
- Jacobson_ring sameAs Q2620920.
- Jacobson_ring wasDerivedFrom Jacobson_ring?oldid=606445904.
- Jacobson_ring isPrimaryTopicOf Jacobson_ring.