Expanding Cech cohomology for quantales

Abstract

We expand Cech cohomology of a topological space X with values in a presheaf on X to Cech cohomology of a commutative ring with unity R with values in a presheaf on R. The strategy is to observe that both the set of open subsets of X and the set of ideals of R provide examples of a (semicartesian) quantale. We study a particular pair of (adjoint) functors (θ, τ) between the quantale of open subsets of X and the quantale of ideals of C(X), the ring of real-valued continuous functions on X. This leads to the main result of this paper: the qth Cech cohomology groups of X with values on the constant sheaf F on X is isomorphic to the qth Cech cohomology groups of the ring C(X) with values on a sheaf F τ on C(X).

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