Directional recurrence and directional rigidity for infinite measure preserving actions of nilpotent lattices

Abstract

Let be a lattice in a simply connected nilpotent Lie group G. Given an infinite measure preserving action T of and a "direction" in G (i.e. an element θ of the projective space P( g) of the Lie algebra g of G), some notions of recurrence and rigidity for T along θ are introduced. It is shown that the set of recurrent directions R(T) and the set of rigid directions for T are both Gδ. In the case where G= Rd and = Zd, we prove that (a) for each Gδ-subset of P( g) and a countable subset D⊂, there is a rank-one action T such that D⊂ R(T)⊂ and (b) R(T)=P( g) for a generic infinite measure preserving action T of . This answers partly a question from a recent paper by A.~Johnson and A.~ Sahin. Some applications to the directional entropy of Poisson actions are discussed. In the case where G is the Heisenberg group H3( R) and =H3( Z), a rank-one -action T is constructed for which R(T) is not invariant under the natural "adjoint" G-action.