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G. Ellis, Gerald Williams (2005)
On the cohomology of generalized triangle groupsCommentarii Mathematici Helvetici, 80
K. Brown (1982)
Cohomology of Groups
(2003)
Recent development in the theory of Fuchsian and Kleinian groups
D. Epstein, D. Holt, M. Atkinson, N. Gilbert, J. Howie, S. Linton, E. Robertson (2000)
Efficient computation in word-hyperbolic groups
C. Wall (1961)
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T. Camps, Volkmar Robel, G. Rosenberger (2008)
Einführung in die kombinatorische und die geometrische Gruppentheorie
(2009)
Homologiegruppen und Eulercharakteristiken hyperbolischer Gruppen
(2001)
Discrete Groups, American Mathematical Society 2001. – (Translations Of Mathematical Monographs
Abstract Hyperbolic groups have been studied in various fields in mathematics. They appear in contexts as diverse as geometric group theory, function theory (as Fuchsian groups) and algebraic topology (as fundamental groups of compact hyperbolic surfaces). Hyperbolic groups possess geometrical properties well suited for the study of homological finiteness conditions. In this paper we will prove some of these results via free resolutions obtained from the Rips-complex.
Groups - Complexity - Cryptology – de Gruyter
Published: Dec 1, 2010
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