On Pro-zero homomorphisms and sequences in local (co-)homology
Abstract
Let = x1,…,xr denote a system of elements of a commutative ring R. For an R-module M we investigate when is M-pro-regular resp. M-weakly pro-regular as generalizations of M-regular sequences. This is done in terms of Cech co-homology resp. homology, defined by Hi(C R ·) resp. by Hi(R R(C,·)) Hi(R(L,·)), where C denotes the Cech complex and L is a bounded free resolution of it as constructed in [17] resp. [16]. The property of being M-pro-regular resp. M-weakly pro-regular follows by the vanishing of certain Cech co-homology resp. homology modules, which is related to completions. This extends previously work by Greenlees and May (see) [5] and Lipman et al. (see [1]). This contributes to a further understanding of Cech (co-)homology in the non-Noetherian case. As a technical tool we use one of Emmanouil's results (see [4]) about the inverse limits and its derived functor. As an application we prove a global variant of the results with an application to prisms in the sense of Bhatt and Scholze (see[3]).
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