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- Koszul–Tate_resolution abstract "In mathematics, a Koszul–Tate resolution or Koszul–Tate complex is a projective resolution of R/M that is an R-algebra (where R is a commutative ring and M is an ideal). They were introduced by Tate (1957) as a generalization of the Koszul complex. Friedemann Brandt, Glenn Barnich, and Marc Henneaux (2000) used the Koszul–Tate resolution to calculate BRST cohomology. The differential of this complex is called the Koszul–Tate derivation or Koszul–Tate differential.".
- Koszul–Tate_resolution wikiPageExternalLink 0105207.
- Koszul–Tate_resolution wikiPageExternalLink S0370-1573(00)00049-1.
- Koszul–Tate_resolution wikiPageExternalLink 1255378502.
- Koszul–Tate_resolution wikiPageExternalLink item?id=BSMF_1950__78__65_0.
- Koszul–Tate_resolution wikiPageID "5291387".
- Koszul–Tate_resolution wikiPageLength "4574".
- Koszul–Tate_resolution wikiPageOutDegree "16".
- Koszul–Tate_resolution wikiPageRevisionID "701540068".
- Koszul–Tate_resolution wikiPageWikiLink BRST_quantization.
- Koszul–Tate_resolution wikiPageWikiLink Category:Commutative_algebra.
- Koszul–Tate_resolution wikiPageWikiLink Category:Homological_algebra.
- Koszul–Tate_resolution wikiPageWikiLink Commutative_ring.
- Koszul–Tate_resolution wikiPageWikiLink Differential_(mathematics).
- Koszul–Tate_resolution wikiPageWikiLink Field_(mathematics).
- Koszul–Tate_resolution wikiPageWikiLink Graded_ring.
- Koszul–Tate_resolution wikiPageWikiLink Ideal_(ring_theory).
- Koszul–Tate_resolution wikiPageWikiLink Koszul_complex.
- Koszul–Tate_resolution wikiPageWikiLink Lie_algebra_cohomology.
- Koszul–Tate_resolution wikiPageWikiLink Polynomial.
- Koszul–Tate_resolution wikiPageWikiLink Polynomial_ring.
- Koszul–Tate_resolution wikiPageWikiLink Rational_number.
- Koszul–Tate_resolution wikiPageWikiLink Resolution_(algebra).
- Koszul–Tate_resolution wikiPageWikiLink Supercommutative_algebra.
- Koszul–Tate_resolution wikiPageWikiLinkText "Koszul–Tate resolution".
- Koszul–Tate_resolution doi "10.1016".
- Koszul–Tate_resolution first "Friedemann".
- Koszul–Tate_resolution first "Glenn".
- Koszul–Tate_resolution first "Marc".
- Koszul–Tate_resolution issn "370".
- Koszul–Tate_resolution issue "5".
- Koszul–Tate_resolution journal "Physics Reports. A Review Section of Physics Letters".
- Koszul–Tate_resolution last "Barnich".
- Koszul–Tate_resolution last "Brandt".
- Koszul–Tate_resolution last "Henneaux".
- Koszul–Tate_resolution mr "1792979".
- Koszul–Tate_resolution pages "439".
- Koszul–Tate_resolution title "Local BRST cohomology in gauge theories".
- Koszul–Tate_resolution url S0370-1573(00)00049-1.
- Koszul–Tate_resolution volume "338".
- Koszul–Tate_resolution wikiPageUsesTemplate Template:Citation.
- Koszul–Tate_resolution wikiPageUsesTemplate Template:Disambiguation_needed.
- Koszul–Tate_resolution wikiPageUsesTemplate Template:Harvs.
- Koszul–Tate_resolution year "2000".
- Koszul–Tate_resolution subject Category:Commutative_algebra.
- Koszul–Tate_resolution subject Category:Homological_algebra.
- Koszul–Tate_resolution hypernym Resolution.
- Koszul–Tate_resolution type Person.
- Koszul–Tate_resolution comment "In mathematics, a Koszul–Tate resolution or Koszul–Tate complex is a projective resolution of R/M that is an R-algebra (where R is a commutative ring and M is an ideal). They were introduced by Tate (1957) as a generalization of the Koszul complex. Friedemann Brandt, Glenn Barnich, and Marc Henneaux (2000) used the Koszul–Tate resolution to calculate BRST cohomology. The differential of this complex is called the Koszul–Tate derivation or Koszul–Tate differential.".
- Koszul–Tate_resolution label "Koszul–Tate resolution".
- Koszul–Tate_resolution sameAs Q6433700.
- Koszul–Tate_resolution sameAs m.0dcxvy.
- Koszul–Tate_resolution sameAs Q6433700.
- Koszul–Tate_resolution wasDerivedFrom Koszul–Tate_resolution?oldid=701540068.
- Koszul–Tate_resolution isPrimaryTopicOf Koszul–Tate_resolution.