Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Hilden, Hugh M.
Lozano, María Teresa
and
Montesinos-Amilibia, Jose María
1992.
Topology '90.
p.
169.
Vulakh, L. Ya.
1993.
Higher-dimensional analogues of Fuchsian subgroups of 𝑃𝑆𝐿(2,𝔬).
Transactions of the American Mathematical Society,
Vol. 337,
Issue. 2,
p.
947.
Aurich, R.
and
Marklof, J.
1996.
Trace formulae for three-dimensional hyperbolic lattices and application to a strongly chaotic tetrahedral billiard.
Physica D: Nonlinear Phenomena,
Vol. 92,
Issue. 1-2,
p.
101.
Marklof, J
1996.
On multiplicities in length spectra of arithmetic hyperbolic three-orbifolds.
Nonlinearity,
Vol. 9,
Issue. 2,
p.
517.
Maclachlan, C.
and
Reid, A. W.
1997.
Generalised Fibonacci manifolds.
Transformation Groups,
Vol. 2,
Issue. 2,
p.
165.
Hurt, Norman E.
1997.
Quantum Chaos and Mesoscopic Systems.
p.
297.
Johnson, N. W.
Kellerhals, R.
Ratcliffe, J. G.
and
Tschantz, S. T.
1999.
The size of a hyperbolic Coxeter simplex.
Transformation Groups,
Vol. 4,
Issue. 4,
p.
329.
Aurich, R.
1999.
The Fluctuations of the Cosmic Microwave Background for a Compact Hyperbolic Universe.
The Astrophysical Journal,
Vol. 524,
Issue. 2,
p.
497.
Aurich, Ralf
2001.
High Performance Computing in Science and Engineering 2000.
p.
89.
Johnson, N.W.
Kellerhals, R.
Ratcliffe, J.G.
and
Tschantz, S.T.
2002.
Commensurability classes of hyperbolic Coxeter groups.
Linear Algebra and its Applications,
Vol. 345,
Issue. 1-3,
p.
119.
Aurich, Ralf
2002.
High Performance Computing in Science and Engineering ’01.
p.
68.
Maclachlan, Colin
and
Reid, Alan W.
2003.
The Arithmetic of Hyperbolic 3-Manifolds.
Vol. 219,
Issue. ,
p.
371.
Maclachlan, Colin
and
Reid, Alan W.
2003.
The Arithmetic of Hyperbolic 3-Manifolds.
Vol. 219,
Issue. ,
p.
305.
Maclachlan, Colin
and
Reid, Alan W.
2003.
The Arithmetic of Hyperbolic 3-Manifolds.
Vol. 219,
Issue. ,
p.
331.
Ferrari, L.
Kolpakov, A.
and
Reid, A.
2022.
Infinitely many arithmetic hyperbolic rational homology 3–spheres that bound geometrically.
Transactions of the American Mathematical Society,
Vol. 376,
Issue. 3,
p.
1979.
Lin, Francesco
and
Lipnowski, Michael
2022.
Monopole Floer Homology, Eigenform Multiplicities, and the Seifert–Weber Dodecahedral Space.
International Mathematics Research Notices,
Vol. 2022,
Issue. 9,
p.
6540.