Local Cohomology and its Applications
Graded greenlees-may duality and the cech hull
Publication
, Chapter
Miller, E
January 1, 2001
The duality theorem of Greenlees and May relating local cohomology with support on an ideal I and the left derived functors of J-adic completion [GM92) holds for rather general ideals in commutative rings. Here, simple formulas are provided for both local cohomology and derived functors of zn-graded completion, when I is a monomial ideal in the Zn-graded polynomial ring k[xl,…, xn] Greenlees-May duality for this case is a consequence. A key construction is the combinatorially defined Cech hull operation on Zn-graded modules [Mil98, MilOO, YanOO]. A simple self-contained proof of GM duality in the derived category is presented for arbitrarily graded noetherian rings, using methods motivated by the Čech hull.
Duke Scholars
ISBN
9781138402133
Publication Date
January 1, 2001
Start / End Page
233 / 253
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Miller, E. (2001). Graded greenlees-may duality and the cech hull. In Local Cohomology and its Applications (pp. 233–253).
Miller, E. “Graded greenlees-may duality and the cech hull.” In Local Cohomology and Its Applications, 233–53, 2001.
Miller E. Graded greenlees-may duality and the cech hull. In: Local Cohomology and its Applications. 2001. p. 233–53.
Miller, E. “Graded greenlees-may duality and the cech hull.” Local Cohomology and Its Applications, 2001, pp. 233–53.
Miller E. Graded greenlees-may duality and the cech hull. Local Cohomology and its Applications. 2001. p. 233–253.
ISBN
9781138402133
Publication Date
January 1, 2001
Start / End Page
233 / 253