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Homologie Des Algebres Commutatives - 206

Andre, M.
Part of the Grundlehren Der Mathematischen Wissenschaften series
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(egalite 3. 4). Ce complexe T*(A,B) per met de definir les modules d'homo- logie de l'algebre (definition 3. 11) Hn(A,B, W) = Yt,,[T*(A,B)@B W] et les modules de cohomologie de l'algebre (definition 3. 12) Hn(A,B, W) = Yfn[HomB(T*(A,B), W)]. En particulier l'homologie et la cohomologie d'une algebre libre sont triviales (corollaire 3. 36). Quant au module Ho(A,B,B) il est toujours isomorphe au module des differentielles de Kaehler QBIA (proposition 6. 3). Lorsque l'anneau Best un quotient de l'anneau A, la situation est simple en degre 1 (proposition 6. 1) H (A, B, W) > Tor}(B, W) I et en degre 2 (theoreme 15. 8, propositions 15. 9 et 15. 12) H (A,B, W) > Tor1(B, W)jTor}(B,B). Tor}(B, W). 2 En ajoutant des variables independantes a l'anneau A, il est d'ailleurs possible de se ramener a ce cas particulier (corollaire 5. 2). Dans cette theorie, les modules d'homologie relative sont en fait des modules d'homologie absolue.

De maniere precise: a une A-algebre B et a une B-algebre C correspond une suite exacte, dite de Jacobi- Zariski (theoreme 5. 1) . . . --+ Hn(A,B, W) --+ Hn(A, C, W) --+ Hn(B, C, W) -+ H _ I (A, B, W) --+ **** n De cette suite decoulent des relations entre differentielles de Kaehler (n = 0), algebres lisses (n = 1), anneaux reguliers (n = 2) et intersections completes (n = 3).

Une autre propriete fondamentale est la suivante (proposition 4.

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Product Details
Springer
3642514499 / 9783642514494
eBook (Adobe Pdf)
512
01/12/2013
French
1 pages
Copy: 10%; print: 10%
PBF Algebra
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