Chern classes of Deligne-Mumford stacks and their coarse moduli spaces

Abstract

Let X be a complex projective algebraic variety with Gorenstein quotient singularities and a smooth Deligne-Mumford stack having X as its coarse moduli space. We show that the CSM class cSM(X) coincides with the pushforward to X of the total Chern class c(TI) of the inertia stack I. We also show that the stringy Chern class cstr(X) of X, whenever is defined, coincides with the pushforward to X of the total Chern class c(TII) of the double inertia stack II. Some consequences concerning stringy/orbifold Hodge numbers are deduced.