Presheaves of triangulated categories and reconstruction of schemes
Abstract
To any triangulated category with tensor product (K,), we associate a topological space Spc(K,), by means of thick subcategories of K, a la Hopkins-Neeman-Thomason. Moreover, to each open subset U of Spc(K,), we associate a triangulated category K(U), producing what could be thought of as a presheaf of triangulated categories. Applying this to the derived category (K,):=(Dperf(X),L) of perfect complexes on a noetherian scheme X, the topological space Spc(K,) turns out to be the underlying topological space of X; moreover, for each open U⊂ X, the category K(U) is naturally equivalent to Dperf(U). As an application, we give a method to reconstruct any reduced noetherian scheme X from its derived category of perfect complexes Dperf(X), considering the latter as a tensor triangulated category with L.
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