Ext #
We define Ext R C n : Cᵒᵖ ⥤ C ⥤ Module R
for any R
-linear abelian category C
by (left) deriving in the first argument of the bifunctor (X, Y) ↦ Module.of R (unop X ⟶ Y)
.
Implementation #
TODO (@joelriou): When the derived category enters mathlib, the Ext groups shall be
redefined using morphisms in the derived category, and then it will be possible to
compute Ext
using both projective or injective resolutions.
Ext R C n
is defined by deriving in the first argument of (X, Y) ↦ Module.of R (unop X ⟶ Y)
(which is the second argument of linearYoneda
).
Equations
- One or more equations did not get rendered due to their size.
Instances For
Given a chain complex X
and an object Y
, this is the cochain complex
which in degree i
consists of the module of morphisms X.X i ⟶ Y
.
Equations
- X.linearYonedaObj A Y = ((((CategoryTheory.linearYoneda A C).obj Y).rightOp.mapHomologicalComplex (ComplexShape.down α)).obj X).unop
Instances For
Ext
can be computed using a projective resolution.
Equations
- One or more equations did not get rendered due to their size.
Instances For
If X : C
is projective and n : ℕ
, then Ext^(n + 1) X Y ≅ 0
for any Y
.