Main theorem of elimination theory

The main theorem of elimination theory states that a projective scheme is proper.

We need to show that ${\displaystyle p:\mathbf {P} _{R}\to \operatorname {Spec} R}$ is closed for a ring R. Thus, let ${\displaystyle X\subset \mathbf {P} _{R}}$ be a closed subset, defined by a homogeneous ideal I of ${\displaystyle R[x_{0},\dots ,x_{n}]}$. Let

${\displaystyle Z_{d}=\{y\in \operatorname {Spec} R|I_{y}\not \supset (x_{0},\dots ,x_{n})^{d}\}}$

where ${\displaystyle I_{y}}$ is Then:

${\displaystyle \textstyle p(X)=\cap _{d}Z_{d}}$.

Thus, it is enough to prove ${\displaystyle Z_{d}}$ is closed. Let M be the matrix whose entries are coefficients of monomials of degree d in ${\displaystyle x_{i}}$ in

${\displaystyle x_{0}^{i_{0}}\cdots x_{n}^{i_{n}}f}$

with homogeneous polynomials f in I and ${\displaystyle i_{0}+\dots +i_{n}+\operatorname {deg} f=d}$. Then the number of columns of M, denoted by q, is the number of monomials of degree d in ${\displaystyle x_{i}}$ (imagine a system of equations.) We allow M to have infinitely many rows.

Then ${\displaystyle y\in Z_{d}\Leftrightarrow M(y)}$ has rank ${\displaystyle <q\Leftrightarrow }$ all the ${\displaystyle q\times q}$-minors vanish at y.

• Mumford, David (1999). The Red Book of Varieties and Schemes. Springer. ISBN 9783540632931.

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