Stringy E-functions of varieties with A-D-E singularities
Abstract
The stringy E-function for normal irreducible complex varieties with at worst log terminal singularities was introduced by Batyrev. It is defined by data from a log resolution. If the variety is projective and Gorenstein and the stringy E-function is a polynomial, Batyrev also defined the stringy Hodge numbers as a generalization of the Hodge numbers of nonsingular projective varieties, and conjectured that they are nonnegative. We compute explicit formulae for the contribution of an A-D-E singularity to the stringy E-function in arbitrary dimension. With these results we can say when the stringy E-function of a variety with such singularities is a polynomial and in that case we prove that the stringy Hodge numbers are nonnegative.
Cite
@article{arxiv.math/0511348,
title = {Stringy E-functions of varieties with A-D-E singularities},
author = {Jan Schepers},
journal= {arXiv preprint arXiv:math/0511348},
year = {2007}
}
Comments
29 pages, 8 figures and 5 tables, to appear in Manuscripta Math