Symbolic powers of ideals and their topology over a module

Abstract

Let I denote an ideal of a Noetherian ring R and N a non-zero finitely generated R-module. In the present paper, some necessary and sufficient conditions are given to determine when the I-adic topology on N is equivalent to the I-symbolic topology on N. Among other things, we shall give a complete solution to the question raised by R. Hartshorne in [ Affine duality and cofiniteness, Invent. Math. 9(1970), 145-164], for a prime ideal p of dimension one in a local Noetherian ring R, by showing that the p-adic topology on N is equivalent to the p-symbolic topology on N if and only if for all z∈ R*N* there exists q∈ (N*) such that z⊂eq q and q R=p. Also, it is shown that if for every p∈ (N) with R/p=1, the p-adic and the p-symbolic topologies are equivalent on N, then N is unmixed and R N has only one element. Finally, we show that if Rp*N*p consists of a single prime ideal, for all p∈ A*(I,N), then the I-adic and the I-symbolic topologies on N are equivalent. abstract