#### Volume 12, issue 3 (2008)

 1 A Bartels, Squeezing and higher algebraic $K$–theory, $K$–Theory 28 (2003) 19 MR1988817 2 A Bartels, T Farrell, L Jones, H Reich, On the isomorphism conjecture in algebraic $K$–theory, Topology 43 (2004) 157 MR2030590 3 A Bartels, W. Lück, H. Reich, The $K$–theoretic Farrell–Jones conjecture for hyperbolic groups, to appear in Invent. Math. 4 A Bartels, D Rosenthal, On the $K$–theory of groups with finite asymptotic dimension, J. Reine Angew. Math. 612 (2007) 35 MR2364073 5 M R Bridson, A Haefliger, Metric spaces of non-positive curvature, Grund. der Math. Wissenschaften [Fund. Principles of Math. Sciences] 319, Springer (1999) MR1744486 6 G Carlsson, B Goldfarb, The integral $K$–theoretic Novikov conjecture for groups with finite asymptotic dimension, Invent. Math. 157 (2004) 405 MR2076928 7 F T Farrell, L E Jones, $K$–theory and dynamics. I, Ann. of Math. $(2)$ 124 (1986) 531 MR866708 8 F T Farrell, L E Jones, Isomorphism conjectures in algebraic $K$–theory, J. Amer. Math. Soc. 6 (1993) 249 MR1179537 9 E Ghys, P d l Harpe, editor, Sur les groupes hyperboliques d'après Mikhael Gromov, Progress in Mathematics 83, Birkhäuser (1990) MR1086648 10 M Gromov, Hyperbolic groups, from: "Essays in group theory", Math. Sci. Res. Inst. Publ. 8, Springer (1987) 75 MR919829 11 M Gromov, Asymptotic invariants of infinite groups, from: "Geometric group theory, Vol. 2 (Sussex, 1991)", London Math. Soc. Lecture Note Ser. 182, Cambridge Univ. Press (1993) 1 MR1253544 12 M Gromov, Metric structures for Riemannian and non-Riemannian spaces, Modern Birkhäuser Classics, Birkhäuser (2007) MR2307192 13 W Lück, Transformation groups and algebraic $K$–theory, Lecture Notes in Math. 1408, Springer (1989) MR1027600 14 I Mineyev, Flows and joins of metric spaces, Geom. Topol. 9 (2005) 403 MR2140987 15 J R Munkres, Topology: a first course, Prentice-Hall (1975) MR0464128 16 R S Palais, On the existence of slices for actions of non-compact Lie groups, Ann. of Math. $(2)$ 73 (1961) 295 MR0126506 17 J Roe, Hyperbolic groups have finite asymptotic dimension, Proc. Amer. Math. Soc. 133 (2005) 2489 MR2146189 18 R. Sauer, Amenable covers, volume and $L^2$–Betti numbers of aspherical manifolds arXiv:math.AT/0605627 19 G Yu, The Novikov conjecture for groups with finite asymptotic dimension, Ann. of Math. $(2)$ 147 (1998) 325 MR1626745