Reconstruction of Formal Schemes from Categories of Nuclear Modules
Abstract
We provide a partially functorial and constructive reconstruction procedure for formal schemes from symmetric monoidal categories of nuclear modules. More precisely, for a formal scheme X, we show that the torsion subcategory Dtors(X) can be recovered as the maximal strongly compactly generated localizing tensor ideal of Efimov's category NucEf(X), and similarly for the Clausen--Scholze category NucCS(X). Combining this with the Balmer spectrum, we reconstruct X from the corresponding symmetric monoidal category of nuclear modules. Moreover, for formal schemes topologically of finite type over a field or over Z, the contravariant functor X NucEf(X) is fully faithful; in the affine case, the analogous statement holds for X NucCS(X).
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