Permutation invariant lattices

We say that a Euclidean lattice in $\mathbb R^n$ is permutation invariant if its automorphism group has non-trivial intersection with the symmetric group $S_n$, i.e., if the lattice is closed under the action of some non-identity elements of $S_n$. Given a fixed element $τ\in S_n$, we study properties of the set of all lattices closed under the action of $τ$: we call such lattices $τ$-invariant. These lattices naturally generalize cyclic lattices introduced by Micciancio, which we studied in a recent paper. Continuing our investigation, we discuss some basic properties of permutation invariant lattices, in particular proving that the subset of well-rounded lattices in the set of all $τ$-invariant lattices in $\mathbb R^n$ has positive co-dimension (and hence comprises zero proportion) for all $τ$ different from an $n$-cycle.