Relatively hyperbolic groups with free abelian second cohomology

Abstract

Suppose G is a 1-ended finitely presented group that is hyperbolic relative to P a finite collection of 1-ended finitely presented proper subgroups of G. Our main theorem states that if the boundary ∂ (G, P) is locally connected and the second cohomology group H2(P, ZP) is free abelian for each P∈ P, then H2(G, ZG) is free abelian. When G is 1-ended it is conjectured that ∂ (G, P) is always locally connected. Under mild conditions on G and the members of P the 1-ended and local connectivity hypotheses can be eliminated and the same conclusion is obtained. When G and each member of P is 1-ended and ∂ (G, P) is locally connected, we prove that the "Cusped Space" for this pair has semistable fundamental group at ∞. This provides a starting point in our proof of the main theorem.