Koszul-Tate resolution in nLab
Context
Homological algebra
(also nonabelian homological algebra)
Context
Basic definitions
Stable homotopy theory notions
Constructions
Lemmas
Homology theories
Theorems
Contents
Idea
For AA an algebra and I⊂AI \subset A an ideal, a Koszul-Tate resolution is a resolution of the quotient A/IA/I by a cochain dg-algebra in non-positive degree that is degreewise free/projective.
It is a refinement of a Koszul complex or rather an extension.
Applications
- A Koszul-Tate resolution is one part of the BRST-BV complex.
References
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Jean-Louis Koszul, Homologie et cohomologie des algèbres de Lie , Bulletin de la Société Mathématique de France, 78, 1950, pp 65-127.
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John Tate, Homology of Noetherian rings and local rings , Illinois Journal of Mathematics, 1, 1957, pp. 14-27
Last revised on November 18, 2023 at 11:09:33. See the history of this page for a list of all contributions to it.