Incommutative algebra, Grothendieck local duality is a duality theorem for cohomologyofmodules over local rings, analogous to Serre dualityofcoherent sheaves.
Suppose that R is a Cohen–Macaulay local ring of dimension d with maximal ideal m and residue field k = R/m. Let E(k) be a Matlis module, an injective hullofk, and let Ω be the completion of its dualizing module. Then for any R-module M there is an isomorphism of modules over the completion of R:
where Hm is a local cohomology group.
There is a generalization to Noetherian local rings that are not Cohen–Macaulay, that replaces the dualizing module with a dualizing complex.
This commutative algebra-related article is a stub. You can help Wikipedia by expanding it. |