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- Bass_number abstract "In mathematics, the ith Bass number of a module M over a local ring R with residue field k is the k-dimension of ExtiR(k,M). More generally the Bass number μi(p,M) of a module M over a ring R at a prime ideal p is the Bass number of the localization of M for the localization of R (with respect to the prime p).Bass numbers were introduced by Hyman Bass (1963, p.11).The Bass numbers describe the minimal injective resolution of a finitely generated module M over a Noetherian ring: for each prime ideal p there is a corresponding indecomposable injective module, and the number of times this occurs in the ith term of a minimal resolution of M is the Bass number μi(p,M).".
- Bass_number wikiPageExternalLink 0010003.
- Bass_number wikiPageExternalLink books?id=LF6CbQk9uScC.
- Bass_number wikiPageID "38345367".
- Bass_number wikiPageRevisionID "583829129".
- Bass_number authorlink "Hyman Bass".
- Bass_number b "R".
- Bass_number first "Hyman".
- Bass_number hasPhotoCollection Bass_number.
- Bass_number last "Bass".
- Bass_number loc "p.11".
- Bass_number p "i".
- Bass_number year "1963".
- Bass_number subject Category:Commutative_algebra.
- Bass_number subject Category:Homological_algebra.
- Bass_number comment "In mathematics, the ith Bass number of a module M over a local ring R with residue field k is the k-dimension of ExtiR(k,M).".
- Bass_number label "Bass number".
- Bass_number sameAs m.0q5h5wt.
- Bass_number sameAs Q4867985.
- Bass_number sameAs Q4867985.
- Bass_number wasDerivedFrom Bass_number?oldid=583829129.
- Bass_number isPrimaryTopicOf Bass_number.