Motivic integration for singular Artin stacks

Abstract

Let X Y be a birational modification of a variety by an Artin stack. In previous work, under the assumption that X is smooth, we proved a change of variables formula relating motivic integrals over arcs of Y to motivic integrals over arcs of X. In this paper, we extend that result to the case where X is singular. We may therefore apply this generalized formula to the so-called warping stack W(X) of X, which may be singular even when X is smooth. We thus obtain a change of variables formula canonically expressing any given motivic integral over arcs of Y as a motivic integral over warped arcs of X.