A universal \'etale lift of a proper local embedding

Abstract

To any finite local embedding of Deligne--Mumford stacks g: Y X we associate an \'etale, universally closed morphism FY/X X such that for the complement Y2X of the image of the diagonal Y Y×XY, the stack FY2X/Y admits a canonical closed embedding in FY/X, and FY/X×XY is a disjoint union of copies of FY2X/Y. The stack FY/X has a natural functorial presentation, and the morphism FY/X X commutes with base-change. The image of Y2X in Y is the locus of points where the morphism Y g(Y) is not smooth. Thus for many practical purposes, the morphism g can be replaced in a canonical way by copies of the closed embedding FY2X/Y FY/X.