Stringy invariants and toric Artin stacks

Abstract: We propose a conjectural framework for computing Gorenstein measures and stringy Hodge numbers in terms of motivic integration over arcs of smooth Artin stacks, and we verify this framework in the case of fantastacks, which are certain toric Artin stacks that provide (nonseparated) resolutions of singularities for toric varieties. Specifically, let $\mathcal {X}$ be a smooth Artin stack admitting a good moduli space $\pi : \mathcal {X} \to X$ , and ass… Show more

“…For algebraically closed fields of characteristic zero, Satriano and Usatine initiated an investigation for a method to study stringy Hodge numbers of a singular variety using motivic integration for Artin stacks in [SU1,SU2]. To address p-adic integration, an analogous framework for p-adic integration on Artin stacks needs to be developed.…”

Desingularization of binomial varieties using toric Artin stacks

“…For algebraically closed fields of characteristic zero, Satriano and Usatine initiated an investigation for a method to study stringy Hodge numbers of a singular variety using motivic integration for Artin stacks in [SU1,SU2]. To address p-adic integration, an analogous framework for p-adic integration on Artin stacks needs to be developed.…”

Desingularization of binomial varieties using toric Artin stacks

Desingularization of binomial varieties using toric Artin stacks