\"Uber die assoziierten Primideale der Vervollst\"andigung
Abstract
Let (R,) be a noetherian local ring and let M be an R-module such that n≥ 1 n M=0. Let M be the completion of M. We show that Ass(M)= Koatt(M) holds in the following three cases: if (R)≤ 1, if M as R-module is flat, or if M is the direct sum of R-modules which are finitely generated. If M is pure in M then at least Ass(M) ⊂ Koatt(M) holds. If the conjecture by A.-M.Simon on complete R-modules is valid then one has Koatt(M)⊂ Ass(M).
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