Relative Hyperbolic Extensions of Groups |
| Abhijit Pal |
| Abstract |
| For a short exact sequence of finitely generated groups 1--->K--->G--->Q--->1, it has been proved by L. Mosher that if K is word hyperbolic and its boundary contains at least three points, then there exists a quasi-isometric section from Q to G. Here we will generalize this result to the relative hyperbolic case. |