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- Jaffard_ring abstract "In mathematics, a Jaffard ring is a type of ring, more general than a Noetherian ring, for which Krull dimension behaves as expected in polynomial extensions. They are named for Paul Jaffard who first studied them in 1960. Formally, a Jaffard ring is a ring R such that the polynomial ringwhere "dim" denotes Krull dimension. A Jaffard ring that is also an integral domain is called a Jaffard domain.The Jaffard property is satisfied by any Noetherian ring R, so examples of non-Jaffardian rings are quite difficult to find. Nonetheless, an example was given in 1953 by Abraham Seidenberg: the subring of consisting of those formal power series whose constant term is rational.".
- Jaffard_ring wikiPageID "12802742".
- Jaffard_ring wikiPageRevisionID "594918516".
- Jaffard_ring hasPhotoCollection Jaffard_ring.
- Jaffard_ring title "Jaffard ring".
- Jaffard_ring urlname "JaffardRing".
- Jaffard_ring subject Category:Ring_theory.
- Jaffard_ring comment "In mathematics, a Jaffard ring is a type of ring, more general than a Noetherian ring, for which Krull dimension behaves as expected in polynomial extensions. They are named for Paul Jaffard who first studied them in 1960. Formally, a Jaffard ring is a ring R such that the polynomial ringwhere "dim" denotes Krull dimension.".
- Jaffard_ring label "Jaffard ring".
- Jaffard_ring sameAs m.02x5l9p.
- Jaffard_ring sameAs Q17098305.
- Jaffard_ring sameAs Q17098305.
- Jaffard_ring wasDerivedFrom Jaffard_ring?oldid=594918516.
- Jaffard_ring isPrimaryTopicOf Jaffard_ring.