Relatively Hyperbolic Groups with Semistable Peripheral Subgroups
Abstract
Suppose G is a finitely presented group that is hyperbolic relative to P a finite collection of 1-ended finitely generated proper subgroups of G. If G and the P are 1-ended and the boundary ∂ (G, P) has no cut point, then G was known to have semistable fundamental group at ∞. We consider the more general situation when ∂ (G, P) contains cut points. Our main theorem states that if G is finitely presented and each P∈ P is finitely generated and has semistable fundamental group at ∞, then G has semistable fundamental group at ∞.
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