Torus actions of complexity one in non-general position

Abstract

Let the compact torus Tn-1 act on a smooth compact manifold X2n effectively with nonempty finite set of fixed points. We pose the question: what can be said about the orbit space X2n/Tn-1 if the action is cohomologically equivariantly formal (which essentially means that Hodd(X2n;Z)=0). It happens that homology of the orbit space can be arbitrary in degrees 3 and higher. For any finite simplicial complex L we construct an equivariantly formal manifold X2n such that X2n/Tn-1 is homotopy equivalent to 3L. The constructed manifold X2n is the total space of the projective line bundle over the permutohedral variety hence the action on X2n is Hamiltonian and cohomologically equivariantly formal. We introduce the notion of the action in j-general position and prove that, for any simplicial complex M, there exists an equivariantly formal action of complexity one in j-general position such that its orbit space is homotopy equivalent to j+2M.