Manifolds realized as orbit spaces of non-free Z2k-actions on real moment-angle manifolds

Abstract

We consider (non-necessarily free) actions of subgroups H⊂ Z2m on the real moment-angle manifold RZP corresponding to a simple convex n polytope P with m facets. The criterion when the orbit space RZP/H is a topological manifold (perhaps with a boundary) can be extracted from results by M.A. Mikhailova and C. Lange. For any dimension n we construct series of manifolds RZP/H homeomorphic to Sn and series of manifolds Mn= RZP/H admitting a hyperelliptic involution τ∈ Z2m/H, that is an involution τ such that Mn/τ is homeomorphic to Sn. For any simple 3-polytope P we classify all subgroups H⊂ Z2m such that RZP/H is homeomorphic to S3. For any simple 3-polytope P and any subgroup H⊂ Z2m we classify all hyperelliptic involutions τ∈ Z2m/H acting on RZP/H. As a corollary we obtain that a 3-dimensional small cover has 3 hyperelliptic involutions in Z23 if and only if it is a rational homology 3-sphere and if and only if it correspond to a triple of Hamiltonian cycles such that each edge of the polytope belongs to exactly two of them.