Toroidal orbifolds, destackification, and Kummer blowings up

Abstract

We show that any toroidal DM stack X with finite diagonalizable inertia possesses a maximal toroidal coarsening Xtcs such that the morphism X Xtcs is logarithmically smooth. Further, we use torification results of [AT17] to construct a destackification functor, a variant of the main result of Bergh [Ber17], on the category of such toroidal stacks X. Namely, we associate to X a sequence of blowings up of toroidal stacks FX\:Y X such that Ytc coincides with the usual coarse moduli space Ycs. In particular, this provides a toroidal resolution of the algebraic space Xcs. Both Xtcs and FX are functorial with respect to strict inertia preserving morphisms X' X. Finally, we use coarsening morphisms to introduce a class of non-representable birational modifications of toroidal stacks called Kummer blowings up. These modifications, as well as our version of destackification, are used in our work on functorial toroidal resolution of singularities.