Universally closed morphism #
A morphism of schemes f : X ⟶ Y
is universally closed if X ×[Y] Y' ⟶ Y'
is a closed map
for all base change Y' ⟶ Y
.
We show that being universally closed is local at the target, and is stable under compositions and base changes.
theorem
AlgebraicGeometry.universallyClosed_iff
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
(f : X ⟶ Y)
:
AlgebraicGeometry.UniversallyClosed f ↔ (AlgebraicGeometry.topologically @IsClosedMap).universally f
class
AlgebraicGeometry.UniversallyClosed
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
(f : X ⟶ Y)
:
A morphism of schemes f : X ⟶ Y
is universally closed if the base change X ×[Y] Y' ⟶ Y'
along any morphism Y' ⟶ Y
is (topologically) a closed map.
- out : (AlgebraicGeometry.topologically @IsClosedMap).universally f
Instances
theorem
AlgebraicGeometry.UniversallyClosed.out
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
{f : X ⟶ Y}
[self : AlgebraicGeometry.UniversallyClosed f]
:
(AlgebraicGeometry.topologically @IsClosedMap).universally f
instance
AlgebraicGeometry.isClosedMap_isStableUnderComposition :
(AlgebraicGeometry.topologically @IsClosedMap).IsStableUnderComposition
instance
AlgebraicGeometry.universallyClosedTypeComp
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
{Z : AlgebraicGeometry.Scheme}
(f : X ⟶ Y)
(g : Y ⟶ Z)
[hf : AlgebraicGeometry.UniversallyClosed f]
[hg : AlgebraicGeometry.UniversallyClosed g]
:
Equations
- ⋯ = ⋯
instance
AlgebraicGeometry.universallyClosed_fst
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
{Z : AlgebraicGeometry.Scheme}
(f : X ⟶ Z)
(g : Y ⟶ Z)
[hg : AlgebraicGeometry.UniversallyClosed g]
:
Equations
- ⋯ = ⋯
instance
AlgebraicGeometry.universallyClosed_snd
{X : AlgebraicGeometry.Scheme}
{Y : AlgebraicGeometry.Scheme}
{Z : AlgebraicGeometry.Scheme}
(f : X ⟶ Z)
(g : Y ⟶ Z)
[hf : AlgebraicGeometry.UniversallyClosed f]
:
Equations
- ⋯ = ⋯