We consider (not necessarily free) actions of subgroups H⊂Z_2^m on the real moment–angle manifold RZ_P corresponding to a simple convex n-polytope P with m facets. A criterion for the orbit space RZ_P/H to be a topological manifold (perhaps with boundary) can be extracted from results by M. A. Mikhailova and C. Lange. For any dimension n we construct a series of manifolds RZ_P/H homeomorphic to S^n and a series of manifolds M^n=RZ_P/H admitting a hyperelliptic involution τ∈Z_2^m/H, that is, an ...

In investigating dynamical systems with chaotic attractors, many aspects of global behavior of a flow or a diffeomorphism with such an attractor are studied by replacing a nontrivial attractor by a trivial one [1, 2, 11, 14]. Such a method allows one to reduce the original system to a regular system, for instance, of a Morse – Smale ...

We consider an effective action of a compact (n-1)-torus on a smooth 2n-manifold with isolated xed points. We prove that under certain conditions the orbit space is a closed topological manifold. In particular, this holds for certain torus actions with disconnected stabilizers. There is a ltration of the orbit manifold by orbit dimensions. The subset ...