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Unfaithful complex
hyperbolic triangle groups, II: Higher order reflections
John R. Parker and Julien Paupert |
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Vol. 239 (2009), No. 2, 357–389
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Abstract |
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We consider symmetric complex hyperbolic triangle groups generated by three complex reflections through angle 2π ∕ p, with p ≥ 3. We restrict our attention to those groups where certain words are elliptic. Our goal is to find necessary conditions for such a group to be discrete. The main application we have in mind is that such groups are candidates for nonarithmetic lattices in SU(2,1). |
Keywordscomplex reflection, complex hyperbolic, lattices in SU(2,1), nonarithmetic lattice |
Mathematical Subject ClassificationPrimary: 20H10, 22E40, 51M10 |
MilestonesReceived: 28 November 2007 |
Authors |
| John R. Parker | |
| Department of Mathematical
Sciences Durham University South Road Durham DH1 3LE United Kingdom |
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| http://www.maths.dur.ac.uk/~dma0jrp/ | |
| Julien Paupert | |
| University of Utah Department of Mathematics 155 South 1400 East Salt Lake City, UT 84112 United States |
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| http://www.math.utah.edu/~paupert | |
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