Displacements

Abstract

Given a functor p:E → B and an object e ∈ E , we define a displacement of e along a morphism : p(e) → b, as a map e → ∇(e) satisfying a universal property analogue to that of a cocartesian lifting (pushforward) \`a la B\'enabou-Grothendieck-Street. There are many difficulties in geometry that come from the fact that forgetful functors such as p: Var(C) → Top don't have displacements of objects along arbitrary maps. And this can be already seen abstractly, since the existence of a left adjoint to p, can be reduced to the existence of all displacements of the initial object. However some schematization functors exist as approximations. In a broader context, if B is a model category and p is a right adjoint, then the right-induced model category on E exists if and only if all displacements along any trivial cofibration , are weak p-equivalences. In these notes we provide some categorical lemmas that will be necessary for future applications. The idea is to have a homotopy descent process for elementary displacements when p has a presentation as a 2-pullback of a family \pi: Ei → B\i∈ J. When suitably applied it should lead to techniques similar to Mumford's GIT through homotopy theory (simplicial presheaves).