BibTeX
CSL-JSON
MLA
Harvard
A hyperbolic counterpart to Rokhlin's cobordism theorem
release_xoz3iljqvnbyxjnk22x2wlxuoe
by
Michelle Chu, Alexander Kolpakov
Released
as a article
.
2020
Abstract
The purpose of the present paper is to prove existence of super-exponentially
many compact orientable hyperbolic arithmetic n-manifolds that are geometric
boundaries of compact orientable hyperbolic (n+1)-manifolds, for any n ≥
2, thereby establishing that these classes of manifolds have the same growth
rate with respect to volume as all compact orientable hyperbolic arithmetic
n-manifolds. An analogous result holds for non-compact orientable hyperbolic
arithmetic n-manifolds of finite volume that are geometric boundaries, for n
≥ 2.
In text/plain
format
Archived Files and Locations
application/pdf 1.6 MB
file_vhxr2t5rtzgibdljwjwkxcycum
|
arxiv.org (repository) web.archive.org (webarchive) |
Read Archived PDF
Preserved and Accessible
arXiv
1905.04774v5
Work Entity
access all versions, variants, and formats of this works (eg, pre-prints)
access all versions, variants, and formats of this works (eg, pre-prints)
Cite This
Lookup Links