A cohomological interpretation for stringy Hodge numbers

Abstract

We obtain a cohomological interpretation for Batyrev's stringy Hodge numbers in the full generality in which they are defined. In a previous paper, the second and third authors used motivic integration to define the stringy Hodge--Deligne invariant of a smooth Artin stack X and proved that when X is a crepant resolution of a variety Y with log-terminal singularities, the generating function for the stringy Hodge numbers of Y is equal to the stringy Hodge--Deligne invariant of X. In this paper, we introduce a cohomology theory Hstr*(X) that computes the stringy Hodge--Deligne invariant of X. Since, by previous work of the second and third authors, all varieties with log-terminal singularities admit a crepant resolution by an Artin stack, this gives a cohomological interpretation for stringy Hodge numbers of any variety with log-terminal singularities. We also show that in the special case where X is Deligne--Mumford, Hstr*(X) coincides with the orbifold cohomology of X.