Beyond twisted arcs: a McKay correspondence for reductive groups

Abstract

We introduce a natural generalization of twisted maps, called warped maps. While twisted maps play an important role in the study of Deligne--Mumford stacks, warped maps are better suited for studying Artin stacks. Heuristically, warped maps see the hidden proper-like behavior satisfied by good moduli space maps. Specifically, we show that every arc of a good moduli space admits a canonical lift, in a warped sense, thereby proving a valuative criterion for good moduli spaces. Furthermore, we prove that warped maps to an Artin stack X are given by usual maps to an auxiliary Artin stack W(X), immediately obtaining a versatile framework for bootstrapping results about usual maps to the setting of warped maps. As an application we obtain a motivic change of variables formula which, given a stacky resolution of singularities X Y, canonically expresses any given motivic integral over arcs of Y as a certain motivic integral over warped arcs of X. In particular, this yields a McKay correspondence for linearly reductive groups.