Generalized Cusps in Real Projective Manifolds: Classification
Abstract
A generalized cusp is diffeomorphic to times a closed Euclidean manifold. Geometrically is the quotient of a properly convex domain by a lattice, , in one of a family of affine groups , parameterized by a point in the (dual closed) Weyl chamber for , and determines the cusp up to equivalence. These affine groups correspond to certain fibered geometries, each of which is a bundle over an open simplex with fiber a horoball in hyperbolic space, and the lattices are classified by certain Bieberbach groups plus some auxiliary data. The cusp has finite Busemann measure if and only if contains unipotent elements. There is a natural underlying Euclidean structure on unrelated to the Hilbert metric.
Cite
@article{arxiv.1710.03132,
title = {Generalized Cusps in Real Projective Manifolds: Classification},
author = {Samuel A. Ballas and Daryl Cooper and Arielle Leitner},
journal= {arXiv preprint arXiv:1710.03132},
year = {2020}
}
Comments
33 pages, 5 figures This version has been significantly rewritten so that the exposition is improved, details have been added, typos have been corrected, and references added