On the set of associated primes of a local cohomology module

Abstract

Assume R is a local Cohen-Macaulay ring. It is shown that R (HlI(R)) is finite for any ideal I and any integer l provided R (H2(x,y)(R)) is finite for any x,y∈ R and R (H3(x1,x2,y)(R)) is finite for any y∈ R and any regular sequence x1,x2∈ R. Furthermore it is shown that R (HlI(R)) is always finite if (R)≤ 3. The same statement is even true for (R)≤ 4 if R is almost factorial.

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