Finiteness of the set of associated primes for local cohomology modules of ideals via properties of almost factorial rings
Abstract
We investigate the finiteness of the set of associated primes for local cohomology modules HIi(J) of an ideal J generated by an R-sequence, through the comparison of HId+1(J) and HId(R/J), where d = depthI(R). The properties of almost factorial rings play a key role in enabling this comparison. Under suitable conditions, we prove that the finiteness of Ass HId+1(J) is equivalent to that of Ass HId(R/J). Moreover, we give a few conditions under which the finiteness of Ass HIi(J) holds for all i.
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