Cohen-Macaulay graded ring/Positive characteristic/Parameter/Tight closure/Degree criterion/Inclusion/Fact/Proof

We assume ${\displaystyle {}d\geq 2}$, lower dimensions may be treated directly. We consider the Koszul-resolution of the parameter ideal ${\displaystyle {}{\left(f_{1},\ldots ,f_{d}\right)}}$. A homogeneous element ${\displaystyle {}h}$ of degree ${\displaystyle {}m}$ gives rise to the graded cohomology class

${\displaystyle {}c=c_{d-1}={\frac {h}{f_{1}\cdots f_{d}}}\in H_{\mathfrak {m}}^{d}(R)\,.}$

Under the condition that ${\displaystyle {}\operatorname {deg} (h)\geq \sum _{j=1}^{d}\operatorname {deg} (f_{i})}$ this cohomology class has nonnegative degree. It is known that ${\displaystyle {}H_{\mathfrak {m}}^{d}(R)}$ is ${\displaystyle {}0}$ for sufficiently large degree, i.e. there is a number ${\displaystyle {}a}$ such that ${\displaystyle {}(H_{\mathfrak {m}}^{d}(R))_{i}=0}$ for all ${\displaystyle {}i>a}$. Now choose a homogeneous element ${\displaystyle {}z\in R_{>a}}$ which does not belong to any minimal prime ideal. Then the degree of

${\displaystyle {}zF^{e*}(c)=z{\frac {h^{q}}{f_{1}^{q}\cdots f_{d}^{q}}}\,}$

is at least ${\displaystyle {}\geq \operatorname {deg} (z)>a}$, so this class must be ${\displaystyle {}0}$ and therefore ${\displaystyle {}h}$ belongs to the tight closure of the parameter ideal.