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Reich, Holger - Institut für Mathematik, Freie Universität Berlin
ON THE K-AND L-THEORY OF THE ALGEBRA OF OPERATORS AFFILIATED TO A FINITE VON NEUMANN
Preprintreihe SFB 478 Geometrische Strukturen in der Mathematik
-BETTI NUMBERS, ISOMORPHISM CONJECTURES AND NONCOMMUTATIVE LOCALIZATION
arXiv:math/0609685v3[math.GT]29Feb2008 Equivariant covers for hyperbolic groups
arXiv:math.AT/0302116v224Mar2004 COMMUTING HOMOTOPY LIMITS AND SMASH PRODUCTS
DETECTING K-THEORY BY CYCLIC HOMOLOGY WOLFGANG LUCK AND HOLGER REICH
Group von Neumann Algebras and Related Algebras
Group von Neumann Algebras and Related Algebras
-BETTI NUMBERS, ISOMORPHISM CONJECTURES AND NONCOMMUTATIVE LOCALIZATION
DETECTING K-THEORY BY CYCLIC HOMOLOGY WOLFGANG LUCK AND HOLGER REICH
IV.2The BaumConnes and the FarrellJones Conjectures
Monographic de L'Enseignement Mathemmique 40 (2008), p. 154-155 K0 AND THE PASSAGE
Fundamental Groups and Covering Spaces Fabian Lenhardt
COEFFICIENTS FOR THE FARRELL-JONES CONJECTURE
ON THE ISOMORPHISM CONJECTURE IN ALGEBRAIC ARTHUR BARTELS, TOM FARRELL, LOWELL JONES, HOLGER REICH
JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY
Preprintreihe SFB 478 Geometrische Strukturen in der Mathematik
THE K-THEORETIC FARRELL-JONES CONJECTURE FOR HYPERBOLIC GROUPS
arXiv:math/0609685v3[math.GT]29Feb2008 Equivariant covers for hyperbolic groups
Journal of Topology 4 (2011) 505528 Ce2011 London Mathematical Society doi:10.1112/jtopol/jtr009
ON THE K-AND L-THEORY OF THE ALGEBRA OF OPERATORS AFFILIATED TO A FINITE VON NEUMANN
A FOLIATED SQUEEZING THEOREM FOR GEOMETRIC ARTHUR BARTELS, TOM FARRELL, LOWELL JONES, AND HOLGER REICH
arXiv:math.AT/0302116v224Mar2004 COMMUTING HOMOTOPY LIMITS AND SMASH PRODUCTS
On the Farrell-Jones Conjecture and its applications
