|
Geometry & Topology 15 (2011)
1883–1925
|
| 1 |
L Auslander,
An
exposition of the structure of solvmanifolds, I: Algebraic
theory, Bull. Amer. Math. Soc. 79 (1973) 227–261
MR0486307 |
| 2 |
M R Bridson,
S M Gersten, The optimal
isoperimetric inequality for torus bundles over the
circle, Quart. J. Math. Oxford Ser. (2) 47 (1996)
1–23 MR1380947 |
| 3 |
T Dymarz, Large scale
geometry of certain solvable groups, Geom. Funct. Anal.
19 (2010) 1650–1687 MR2594617 |
| 4 |
T Dymarz, I
Peng, Bilipschitz maps
of boundaries of certain negatively curved homogeneous
spaces, Geom. Dedicata 152 (2011) 129–145 |
| 5 |
A Dyubina, Instability of
the virtual solvability and the property of being virtually
torsion-free for quasi-isometric groups, Internat.
Math. Res. Notices (2000) 1097–1101 MR1800990 |
| 6 |
A Eskin, D
Fisher, K Whyte, Quasi-isometries
and rigidity of solvable groups, Pure Appl. Math. Q. 3
(2007) 927–947 MR2402598 |
| 7 |
A Eskin, D
Fisher, K Whyte, Coarse differentiation of
quasi-isometries I: Spaces not quasi-isometric to Cayley
graphs arXiv:math/0607207 |
| 8 |
A Eskin, D
Fisher, K Whyte, Coarse differentiation of
quasi-isometries II: Rigidity for Sol and Lamplighter
groups arXiv:0706.0940 |
| 9 |
Y Guivarc'h, Sur la
loi des grands nombres et le rayon spectral d'une marche
aléatoire, from: "Conference on Random Walks
(Kleebach, 1979)", Astérisque 74, Soc. Math. France (1980)
47–98, 3 MR588157
In French |
| 10 |
D V Osin,
Exponential radicals
of solvable Lie groups, J. Algebra 248 (2002)
790–805 MR1882124 |
| 11 |
I Peng, Coarse
differentiation and quasi-isometries of a class of solvable Lie
groups II, Geom. Topol. 15 (2011)
1927–1981 |
