The support of top graded local cohomology modules

Abstract

Let R0 be any domain, let R=R0[U1, ..., Us]/I, where U1, ..., Us are indeterminates of some positive degrees, and I⊂ R0[U1, ..., Us] is a homogeneous ideal. The main theorem in this paper is states that all the associated primes of H:=HsR+(R) contain a certain non-zero ideal c(I) of R0 called the ``content'' of I. It follows that the support of H is simply V((I)R + R+) (Corollary 1.8) and, in particular, H vanishes if and only if c(I) is the unit ideal. These results raise the question of whether local cohomology modules have finitely many minimal associated primes-- this paper provides further evidence in favour of such a result. Finally, we give a very short proof of a weak version of the monomial conjecture based on these results.

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