A Mapping Theorem for Derived Foliations
Abstract
In this paper, we construct in characteristic zero a derived foliation on derived mapping stacks MapS(X,Y), for S a base derived stack, X a proper schematic, flat, and local complete intersection derived stack over S, and Y a relative derived Deligne-Mumford stack over S, when Y is equipped with a derived foliation relative to S. In the process, given a relative derived Deligne-Mumford stack Z over a derived stack X, we will first show that the ∞-category of derived foliations over Z relative to X embeds as a full subcategory of derived stacks over Z equipped with extra structure, and describe its essential image explicitly. We will then show that given a proper schematic, flat, and local complete intersection map of derived stacks f : X Y, the push-forward functor f* from derived stacks over X to derived stacks over Y preserves the preceding essential images, and thus defines a push-forward, from derived foliations over Z relative to X, to derived foliations over f* Z relative to Y. The aforementioned result on derived mapping stacks is obtained as a special case of this statement. As example applications, given a smooth projective scheme X equipped with a derived folation, we obtain derived folations on the derived moduli stacks R Mg,n(X) and R Hilblci(X), which are respectively the derived enhancements of the moduli stack of families of stable curves of genus g with n marked points on X, and of the Hilbert scheme of closed subschemes of X.
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