Algebraic & Geometric Topology Volume 15, issue 2 (2015)

Download this article
	For screen
	For printing

Recent Issues

The Journal

About the journal

Ethics and policies

Peer-review process

Submission guidelines

Submission form

Editorial board

ISSN (electronic): 1472-2739

ISSN (print): 1472-2747

Other MSP journals

A geometrically bounding hyperbolic link complement

Leone Slavich

Algebraic & Geometric Topology 15 (2015) 1175–1197

DOI: 10.2140/agt.2015.15.1175

Bibliography

1	F Costantino, R Frigerio, B Martelli, C Petronio, Triangulations of $3$–manifolds, hyperbolic relative handlebodies and Dehn filling, Comment. Math. Helv. 82 (2007) 903 MR2341844
2	G W Gibbons, Tunnelling with a negative cosmological constant, Nuclear Phys. B 472 (1996) 683 MR1399279
3	M Gromov, I Piatetski-Shapiro, Nonarithmetic groups in Lobachevsky spaces, Inst. Hautes Études Sci. Publ. Math. (1988) 93 MR932135
4	A Kolpakov, B Martelli, Hyperbolic four-manifolds with one cusp, Geom. Funct. Anal. 23 (2013) 1903 MR3132905
5	A Kolpakov, B Martelli, S T Tschantz, Some hyperbolic three-manifolds that bound geometrically, arXiv:1311.2993
6	D D Long, A W Reid, On the geometric boundaries of hyperbolic $4$–manifolds, Geom. Topol. 4 (2000) 171 MR1769269
7	D D Long, A W Reid, Constructing hyperbolic manifolds which bound geometrically, Math. Res. Lett. 8 (2001) 443 MR1849261
8	J G Ratcliffe, S T Tschantz, Gravitational instantons of constant curvature, Classical Quantum Gravity 15 (1998) 2613 MR1649662
9	J G Ratcliffe, S T Tschantz, On the growth of the number of hyperbolic gravitational instantons with respect to volume, Classical Quantum Gravity 17 (2000) 2999 MR1777000
10	J G Ratcliffe, S T Tschantz, The volume spectrum of hyperbolic $4$–manifolds, Experiment. Math. 9 (2000) 101 MR1758804
11	D Rolfsen, Knots and links, Math. Lecture Series 7, Publish or Perish (1990) MR1277811
12	W P Thurston, The geometry and topology of three-manifolds, Princeton Univ. Math. Dept. Lecture Notes (1979)