Intersection numbers of Chern classes of tautological line bundles on the moduli spaces of flexible polygons

Abstract

Given a flexible n-gon with generic side lengths, the moduli space of its configurations in R2 as well as in R3 is a smooth manifold. It is equipped with n tautological line bundles whose definition is motivated by M. Kontsevich's tautological bundles over M0,n. We study their Euler classes, first Chern classes and intersection numbers, that is, top monomials in Chern (Euler) classes. The latter are interpreted geometrically as the signed numbers of some triangular configurations of the flexible polygon.