The 6-Functor Formalism for $\mathbb Z_\ell$- and $\mathbb Q_\ell$-Sheaves on Diamonds

Lucas Mann

The 6-Functor Formalism for Z- and Q-Sheaves on Diamonds

Abstract

For every nuclear Z-algebra and every small v-stack X we construct an ∞-category Dnuc(X,) of nuclear -modules on X. We then construct a full 6-functor formalism for these sheaves, generalizing the \'etale 6-functor formalism for = F. Prominent choices for are Z, Q and Q and especially in the latter two cases, no satisfying 6-functor formalism has been found before. Applied to classifying stacks we obtain a theory of nuclear representations, i.e. continuous representations on filtered colimits of Banach spaces.

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