On a generalization of a result of Peskine and Szpiro
Abstract
Let (R,m) be a regular local ring containing a field K. Let I be a Cohen-Macaulay ideal of height g. If char K = p > 0 then by a result of Peskine and Szpiro the local cohomology modules HiI(R) vanish for i > g. This result is not true if char K = 0. However we prove that the Bass numbers of the local cohomology module HgI(R) completely determine whether HiI(R) vanish for i > g.
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