Infinitely many arithmetic hyperbolic rational homology 3–spheres that bound geometrically
From MaRDI portal
Publication:5878217
DOI10.1090/tran/8816OpenAlexW4308734454WikidataQ115545606 ScholiaQ115545606MaRDI QIDQ5878217
Leonardo Ferrari, Alexander Kolpakov, Alan W. Reid
Publication date: 20 February 2023
Published in: Transactions of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2203.01997
Embeddings in differential topology (57R40) Immersions in differential topology (57R42) Hyperbolic 3-manifolds (57K32)
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Mutation and the \(\eta\)-invariant
- On the optimality of the ideal right-angled 24-cell
- Convex polytopes, Coxeter orbifolds and torus actions
- Groups of automorphisms of unimodular hyperbolic quadratic forms over the ring \({\mathbb{Z}}[(\sqrt{5}+1)/2\)]
- Geometry II: spaces of constant curvature. Transl. from the Russian by V. Minachin
- The Magma algebra system. I: The user language
- On the geometric boundaries of hyperbolic 4-manifolds
- Embedding arithmetic hyperbolic manifolds
- On right-angled reflection groups in hyperbolic spaces.
- Dreidimensionale euklidische Raumformen
- Multiplicative structure of the cohomology ring of real toric spaces
- On compact hyperbolic manifolds of Euler characteristic two
- Automorphic forms and rational homology 3-spheres
- Pro-\(p\) groups and towers of rational homology spheres
- Hyperbolic four-manifolds with one cusp
- Hyperbolic 4‐manifolds, colourings and mutations
- Minimum volume cusped hyperbolic three-manifolds
- The arithmetic structure of tetrahedral groups of hyperbolic isometries
- Small covers of the dodecahedron and the $120$-cell
- Cusps of hyperbolic 4‐manifolds and rational homology spheres
- Many cusped hyperbolic 3-manifolds do not bound geometrically
- Foundations of Hyperbolic Manifolds
- Some hyperbolic three-manifolds that bound geometrically
- RINGS OF DEFINITION OF DENSE SUBGROUPS OF SEMISIMPLE LINEAR GROUPS
- A Hyperbolic Counterpart to Rokhlin’s Cobordism Theorem
- Constructing hyperbolic manifolds which bound geometrically
- Notes on right-angled Coxeter polyhedra in hyperbolic spaces.
This page was built for publication: Infinitely many arithmetic hyperbolic rational homology 3–spheres that bound geometrically
