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Let $p=2$, $R=k[[x,y]]/(x^2,xy)$. Then $H^0_m(R) \cong R/m= k$. $F(k) = R/m^{[2]}= k[[x,y]]/(x^2,xy,y^2)$ has length $3 \neq 2\times 1$. In general for a finite length module $M$, the condition that …

I am not an expert, but let me point out that computing $CH^0(X)$ (which is freely generated by the irreducible components) is already quite hard. Algorithms do exist in this case, see page 206 of "Id …

I recently found some references: Theorem 4.5 of this paper and Theorem 4 + next Corollary of this paper which says: If $(R,m,k)$ is a complete normal local domain of dimension $2$ such that $k$ …

Let R be a local, normal domain of dimension 2. Suppose that R contains a finite field. I am interested in knowing when the class group of R is torsion. In characteristic 0, this is known to be relate …

Dear Matt: The people who are actively working with this whom I know are Genady Lyubeznik and Manuel Blickle. The key point seems to be that certain $R[F]$-modules become simpler when viewed as $D_R$- …