Isometry groups of non-positively curved spaces: discrete subgroups

We prove that if G is a group acting cellularly on a locally finite CAT(0) cube complex X and the action is simply transitive on the vertices of X , then G has a generating set A so that the geodesic words in generators A form a regular language and the growth function of G with respect to A is rati

Let H be a properly discontinuous group of isometries of a negatively curved (Gromov hyperbolic) metric space X. We give equivalent conditions on H to be quasi-convex. The main application of this is to give alternate definitions of quasi-convex, or rational subgroups of negatively curved (word hype

The fundamental groups of complete squared complexes are a class of groups, some of which are not residually finite. A method is given for embedding the fundamental group of a complete squared complex as a subgroup of a square of finite groups, all of whose (Gersten-Stallings) vertex angles are \_<

We calculate the full isometry group in the case G/H admits a homogeneous metric of positive sectional curvature.