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Complex hyperbolic free groups with many parabolic elements

Parker, John R.; Will, Pierre

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Authors

Pierre Will



Abstract

We consider in this work representations of the of the fundamental group of the 3-punctured sphere in PU(2,1) such that the boundary loops are mapped to PU(2,1) . We provide a system of coordinates on the corresponding representation variety, and analyse more specifically those representations corresponding to subgroups of (3,3,∞) -groups. In particular we prove that it is possible to construct representations of the free group of rank two $\la a,b\ra$ in PU(2,1) for which a , b , ab , ab −1 , ab 2 , a 2 b and [a,b] all are mapped to parabolics.

Citation

Parker, J. R., & Will, P. (2012, December). Complex hyperbolic free groups with many parabolic elements. Presented at Groups, Geometry and Dynamics, Almora, Uttarakhand, India

Presentation Conference Type Conference Paper (published)
Conference Name Groups, Geometry and Dynamics
Start Date Dec 3, 2012
End Date Dec 16, 2012
Publication Date May 27, 2015
Deposit Date Oct 20, 2014
Publicly Available Date Oct 21, 2014
Pages 327-348
Series Title Contemporary mathematics
Series Number 639
Series ISSN 0271-4132,1098-3627
Book Title Geometry, groups and dynamics : ICTS program : groups, geometry and dynamics, December 3-16, 2012, Almora, India.
DOI https://doi.org/10.1090/conm/639/12782
Public URL https://durham-repository.worktribe.com/output/1154833
Related Public URLs http://arxiv.org/abs/1312.3795

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Copyright Statement
© 2015 American Mathematical Society. First published in 'Geometry, groups and dynamics: ICTS program: groups, geometry and dynamics, December 3-16, 2012, Almora, India.' in Contemporary mathematics series, 639, 2015, published by the American Mathematical Society.





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