Last update: 16 April 2013
Vincent Emery
Department of Mathematics
Stanford University - California
vincent.emery@gmail.com
Research interests
Arithmetic lattices, hyperbolic volume, locally symmetric spaces, K-theory of number fields
Publications and preprints
Preprints
- On compact hyperbolic manifolds of Euler characteristic two
arXiv:1304.3509
- Torsion homology of arithmetic lattices and K2 of imaginary fields
arXiv:1303.6132
Journal articles
- The three smallest compact arithmetic hyperbolic 5-orbifolds
with Ruth Kellerhals
Algebr. Geom. Topol. 13 (2), 817—829, 2013
arXiv:1205.2984
- Even unimodular Lorentzian lattices and hyperbolic volume
to appear in J. Reine Angew. Math.
arXiv:1201.5261
- Covolumes of nonuniform lattices in PU(n,1)
with Matthew Stover
to appear in Amer. J. Math.
arXiv:1107.5281
- Appendix to "On the arithmetic and geometry of binary Hamiltonian forms"
article by Jouni Parkkonen and Frédéric Paulin
to appear in Algebra Number Theory
arXiv:1105.2290
- Arbitrarily large families of spaces of the same volume
Geom. Dedicata 160, 313—320, 2012.
arXiv:1107.3043
- On volumes of arithmetic quotients of PO(n,1)°, n odd
with Misha Belolipetsky
Proc. Lond. Math. Soc. (3) 105 (3), 541—570, 2012.
arXiv:1001.4670
PhD thesis
- Du volume des quotients arithmétiques de l'espace hyperbolique.
Fribourg, 2009.
PDF file
Reports, etc.
- On the compact arithmetic 5-orbifold of smallest volume
Oberwolfach Rep. 7 (3), report 35/2010: "Low-Dimensional Topology and Number Theory", 2010. (link)