The main theorem of elimination theory states that a projective scheme is proper.
We need to show that p : P R → Spec R {\displaystyle p:\mathbf {P} _{R}\to \operatorname {Spec} R} is closed for a ring R. Thus, let X ⊂ P R {\displaystyle X\subset \mathbf {P} _{R}} be a closed subset, defined by a homogeneous ideal I of R [ x 0 , … , x n ] {\displaystyle R[x_{0},\dots ,x_{n}]} . Let
Then:
Thus, it is enough to prove Z d {\displaystyle Z_{d}} is closed. Let M be the matrix with
Then y ∈ Z d ⇔ M ( y ) {\displaystyle y\in Z_{d}\Leftrightarrow M(y)} has rank < q ⇔ {\displaystyle <q\Leftrightarrow } all the q × q {\displaystyle q\times q} -minors vanish at y.
This geometry-related article is a stub. You can help Wikipedia by expanding it.
is closed for a ring R. Thus, let 
be a closed subset, defined by a homogeneous ideal I of ![{\displaystyle R[x_{0},\dots ,x_{n}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/6b930c4d63448c6e57b1760bf4f8622b574a177a)
. Let
.
.
is closed. Let M be the matrix with
has rank 
all the 
-minors vanish at y.
