AbstractFollowing previous work of the second author, we establish more properties of groups of circle homeomorphisms which admit invariant laminations.
In this paper, we focus on a certain type of such groups, so-called pseudo-fibered groups, and show that many 3-manifold groups are examples of pseudo-fibered groups.
We then prove that torsion-free pseudo-fibered groups satisfy a Tits alternative.
We conclude by proving that a purely hyperbolic pseudo-fibered group acts on the 2-sphere as a convergence group.
This leads to an interesting question if there are examples of pseudo-fibered groups other than 3-manifold groups.
