Symbolic substitution systems beyond abelian groups

Symbolic substitution systems are an important source of aperiodic Delone sets in abelian locally compact groups. In this article, we consider a large class of non-abelian nilpotent Lie groups with dilation structures, which we refer to as rationally homogeneous Lie groups with rational spectrum (RAHOGRASPs). We show, by explicit construction, that every RAHOGRASP admits a lattice with a primitive symbolic substitution system and hence contains a weakly aperiodic linearly repetitive Delone set. These are the first examples of weakly aperiodic linearly repetitive Delone sets in non-abelian Lie groups. Building on our previous work, we establish unique ergodicity of the corresponding Delone dynamical systems. Our construction applies in particular to all two-step nilpotent Lie groups defined over $\mathbb Q$ such as the Heisenberg group. In this case, the Delone sets in question are in fact strongly aperiodic, i.e. the underlying action of the corresponding Delone dynamical system is free.