Emily Hamilton, Henry Wilton, Pavel Zalesskii
Published 2011-09-13, updated 2012-05-15Version 2
Let M = H^3 / \Gamma be a hyperbolic 3-manifold of finite volume. We show that if H and K are abelian subgroups of \Gamma and g is in \Gamma, then the double coset HgK is separable in \Gamma. As a consequence we prove that if M is a closed, orientable, Haken 3-manifold and the fundamental group of every hyperbolic piece of the torus decomposition of M is conjugacy separable then so is the fundamental group of M. Invoking recent work of Agol and Wise, it follows that if M is a compact, orientable 3-manifold then \pi_1(M) is conjugacy separable.
Comments: 25 pages; incorporates Agol's solution to the Virtually Haken Conjecture to prove conjugacy separability for all 3-manifold groups; to appear in the Journal of the LMS
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