Skew category algebras and modules on ringed finite sites
Abstract
Let C be a small category. We investigate ringed sites (C,R) on C and the resulting module categories M od-R. When C is finite, based on Grothendieck and Verdier's classification of finite topoi, we prove that each M od-R is equivalent to Mod-R|D[D], where R|D[D] is the skew category algebra, canonically defined on (C,R), for a uniquely determined full subcategory D⊂C and the restriction R|D of R to D.
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