COMPLEX HYPERBOLIC (3, 3, n) TRIANGLE GROUPS
نویسندگان
چکیده
Complex hyperbolic triangle groups are representations of a hyperbolic (p, q, r) reflection triangle group to the group of holomorphic isometries of complex hyperbolic space H C , where the generators fix complex lines. In this paper, we obtain all the discrete and faithful complex hyperbolic (3, 3, n) triangle groups. Our result solves a conjecture of Schwartz [16] in the case when p = q = 3.
منابع مشابه
NON-DISCRETE COMPLEX HYPERBOLIC TRIANGLE GROUPS OF TYPE (n, n,∞; k)
A complex hyperbolic triangle group is a group generated by three complex reflections fixing complex slices (complex geodesics) in complex hyperbolic space. Our purpose in this paper is to improve the result in [3] and to discuss discreteness of complex hyperbolic triangle groups of type (n, n,∞; k).
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