Associated primes of Local cohomology modules over Regular rings
Abstract
Let R be an excellent regular ring of dimension d containing a field K of characteristic zero. Let I be an ideal in R. We show that Ass \ Hd-1I(R) is a finite set. As an application we show that if I is an ideal of height g with height \ Q = g for all minimal primes of I then for all but finitely many primes P ⊃eq I with height \ P ≥ g +2, the topological space Spec(RP/IRP) is connected.
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