445 research outputs found
On the annihilators and attached primes of top local cohomology modules
Let \frak a be an ideal of a commutative Noetherian ring R and M a finitely
generated R-module. It is shown that {\rm Ann}_R(H_{\frak a}^{{\dim M}({\frak
a}, M)}(M))= {\rm Ann}_R(M/T_R({\frak a}, M)), where T_R({\frak a}, M) is the
largest submodule of M such that {\rm cd}({\frak a}, T_R({\frak a}, M))< {\rm
cd}({\frak a}, M). Several applications of this result are given. Among other
things, it is shown that there exists an ideal \frak b of R such that {\rm
Ann}_R(H_{\frak a}^{\dim M}(M))={\rm Ann}_R(M/H_{\frak b}^{0}(M)). Using this,
we show that if H_{\frak a}^{\dim R}(R)=0, then {\rm Att}_RH^{{\dim
R}-1}_{\frak a}(R)=\{{\frak p}\in {\rm Spec}\,R|\,{\rm cd}({\frak a}, R/{\frak
p})={\dim R}-1\}. These generalize the main results of \cite[Theorem 2.6]{BAG},
\cite[Theorem 2.3]{He} and \cite[Theorem 2.4]{Lyn}.Comment: To appear in Arch. der Mat
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