Ext Functor on Noetherian Affine Schemes

  • POTW
  • Thread starter Euge
  • Start date
In summary, the Ext functor on Noetherian affine schemes is used to measure the "distance" between two sheaves on a Noetherian affine scheme. It is a generalization of the Hom functor and is calculated using the concept of a resolution. Some applications of the Ext functor include studying sheaves on algebraic varieties and understanding relationships between sheaves. It is also closely related to other mathematical concepts such as cohomology, derived functors, and Serre duality.
  • #1
Euge
Gold Member
MHB
POTW Director
2,073
244
Let ##M## and ##N## be finitely generated modules over a Noetherian ring ##R##. For every ##R##-module ##S## let ##\tilde{S}## be the associated sheaf on the affine scheme ##X = \operatorname{Spec}R##. Show that for all ##q \ge 0##, the associated sheaf of the ##R##-module ##\operatorname{Ext}^q_R(M,N)## is the Ext sheaf ##\mathscr{E}xt^q_{\mathcal{O}_X}(\tilde{M},\tilde{N})##.
 
  • Like
Likes topsquark
Physics news on Phys.org
  • #2
Since ##M## is finite over Noetherian ring ##R##, there is a finitely generated free resolution ##\cdots \to L_1 \to L_0 \to M \to 0## for ##M##. Applying the tilde functor yields a resolution of ##\tilde{M}## by finite locally free ##\mathcal{O}_X##-modules ##\cdots \to \tilde{L}_1 \to \tilde{L}_0 \to \tilde{M} \to 0##. Hence ##\mathscr{E}xt^q_{\mathcal{O}_X}(\tilde{M}, \tilde{N})## is the ##q##-th cohomology of the complex ##\mathscr{H}om_{\mathcal{O}_X}(\tilde{L}^\cdot, \tilde{N})##. There is an natural isomorphism of complexes ##\mathscr{H}om_{\mathcal{O}_X}(\tilde{L}^\cdot, \tilde{N}) = \widetilde{\text{Hom}_{\mathcal{O}_X}(L^\cdot, N)}## and cohomology commutes with the tilde functor; furthermore, the ##q##th cohomology of ##\text{Hom}_{\mathcal{O}_X}(L^\cdot, N)## is ##\text{Ext}^q_R(M,N)##. Therefore ##\mathscr{E}xt^q_{\mathcal{O}_X}(\tilde{M}, \tilde{N}) \cong \widetilde{\text{Ext}^q_R(M,N)}##, as desired.
 
Last edited:
  • Like
Likes topsquark
  • #3
Using the Grothendieck definition of cohomology by injective resolutions, the fact that Tilda of an injective R module is an injective O_X module, that Tilda commutes with kernels and cokernels, and is a fully faithful equivalence from R modules to O_X modules, this seems to reduce to the case of "sheaf Hom", i.e. sheaf Ext^0, where it seems to follow from the fact that on finitely generated modules (actually we seem only to need M finitely generated), Hom commutes with localization.

I.e. to compute Ext, take an injective R module resolution J(*) of N, and apply Hom(M,_), to get a complex C = Hom(M,J(*)), whose cohomology is Ext*(M,N). Applying Tilda to C, gives a complex whose cohomology is Tilda of Ext, since Tilda preserves kernels and cokernels. But since Hom commutes with localization for finitely generated M, applying Tilda to C is the same as first applying Tilda to J, getting an injective O_X module resolution of NTilda, and then applying sheafHom(MTilda,_), to get the complex whose cohomology is sheafExt. Hence sheafExt is Tilda of Ext in this case.
 
Last edited:
  • Like
Likes topsquark

Similar threads

Replies
1
Views
901
Replies
7
Views
2K
Replies
17
Views
2K
Replies
16
Views
5K
Replies
28
Views
6K
Back
Top