An Ehrhart Theory For Tautological Intersection Numbers
Algebraic Geometry
2022-09-29 v1 Combinatorics
Abstract
We discover that tautological intersection numbers on , the moduli space of stable genus curves with marked points, are evaluations of Ehrhart polynomials of partial polytopal complexes. In order to prove this, we realize the Virasoro constraints for tautological intersection numbers as a recursion for integer-valued polynomials. Then we apply a theorem of Breuer that classifies Ehrhart polynomials of partial polytopal complexes by the nonnegativity of their -vector. In dimensions 1 and 2, we show that the polytopal complexes that arise are \emph{inside-out polytopes} i.e. polytopes that are dissected by a hyperplane arrangement.
Cite
@article{arxiv.2209.14131,
title = {An Ehrhart Theory For Tautological Intersection Numbers},
author = {Adam Afandi},
journal= {arXiv preprint arXiv:2209.14131},
year = {2022}
}