Abstract
Abstract
Let
$\Gamma =\langle I_{1}, I_{2}, I_{3}\rangle $
be the complex hyperbolic
$(4,4,\infty )$
triangle group with
$I_1I_3I_2I_3$
being unipotent. We show that the limit set of
$\Gamma $
is connected and the closure of a countable union of
$\mathbb {R}$
-circles.
Publisher
Cambridge University Press (CUP)
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