Dynamics of Actions of Automorphisms of Discrete Groups G on SubG and Applications to Lattices in Lie Groups

Abstract

For a discrete group G and the compact space SubG of (closed) subgroups of G endowed with the Chabauty topology, we study the dynamics of actions of automorphisms of G on SubG in terms of distality and expansivity. We also study the structure and properties of lattices in a connected Lie group. In particular, we show that the unique maximal solvable normal subgroup of is polycyclic and the corresponding quotient of is either finite or admits a cofinite subgroup which is a lattice in a connected semisimple Lie group with certain properties. We also show that Subc, the set of cyclic subgroups of , is closed in Sub. We prove that an infinite discrete group which is either polycyclic or a lattice in a connected Lie group, does not admit any automorphism which acts expansively on Subc, while only the finite order automorphisms of act distally on Subc. For an automorphism T of a connected Lie group G and a T-invariant lattice in G, we compare the behaviour of the actions of T on SubG and Sub in terms of distality. We put certain conditions on the structure of the Lie group G under which we show that T acts distally on SubG if and only if it acts distally on Sub. We construct counter examples to show that this does not hold in general if the conditions on the Lie group are relaxed.