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In commutative algebra, André–Quillen cohomology is a theory of cohomology for commutative rings which is closely related to the cotangent complex. The first three cohomology groups were introduced by Stephen Lichtenbaum and Michael Schlessinger and are sometimes called Lichtenbaum–Schlessinger functors T0, T1, T2, and the higher groups were defined independently by Michel André and Daniel Quillen using methods of homotopy theory. It comes with a parallel homology theory called André–Quillen homology.

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  • André–Quillen cohomology (en)
  • André–Quillenkohomologi (sv)
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  • In commutative algebra, André–Quillen cohomology is a theory of cohomology for commutative rings which is closely related to the cotangent complex. The first three cohomology groups were introduced by Stephen Lichtenbaum and Michael Schlessinger and are sometimes called Lichtenbaum–Schlessinger functors T0, T1, T2, and the higher groups were defined independently by Michel André and Daniel Quillen using methods of homotopy theory. It comes with a parallel homology theory called André–Quillen homology. (en)
  • Inom kommutativ algebra är André–Quillenkohomologi en kohomologiteori för kommutativa ringar som är nära relaterad till . De första tre kohomologigrupperna introducerades av ) och kallas ibland Lichtenbaum–Schlessinger-funktorerna T0, T1, T2, och de högre grupperna definierades oberoende av och genom att använda . En parallell homologiteori är André–Quillenhomologi. (sv)
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  • Michel André (en)
  • Daniel Quillen (en)
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  • Daniel (en)
  • Michael (en)
  • Stephen (en)
  • Michel (en)
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  • André (en)
  • Lichtenbaum (en)
  • Quillen (en)
  • Schlessinger (en)
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  • In commutative algebra, André–Quillen cohomology is a theory of cohomology for commutative rings which is closely related to the cotangent complex. The first three cohomology groups were introduced by Stephen Lichtenbaum and Michael Schlessinger and are sometimes called Lichtenbaum–Schlessinger functors T0, T1, T2, and the higher groups were defined independently by Michel André and Daniel Quillen using methods of homotopy theory. It comes with a parallel homology theory called André–Quillen homology. (en)
  • Inom kommutativ algebra är André–Quillenkohomologi en kohomologiteori för kommutativa ringar som är nära relaterad till . De första tre kohomologigrupperna introducerades av ) och kallas ibland Lichtenbaum–Schlessinger-funktorerna T0, T1, T2, och de högre grupperna definierades oberoende av och genom att använda . En parallell homologiteori är André–Quillenhomologi. (sv)
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  • Stephen Lichtenbaum (en)
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  • Michael Schlessinger (en)
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