The foundations of (2n,k)-manifolds

Abstract

In the focus of our paper is a system of axioms that serves as a basis for introducing structural data for (2n,k)-manifolds M2n, where M2n is a smooth, compact 2n-dimensional manifold with a smooth effective action of the k-dimensional torus Tk. In terms of these data a construction of the model space E with an action of the torus Tk is given, such that there exists a Tk-equivariant homeomorphism E M2n. This homeomorphism induces a homeomorphism E/Tk M2n/Tk. The number d=n-k is called the complexity of an (2n,k)-manifold. Our theory comprises toric geometry and toric topology, where d=0. It is shown that the class of homogeneous spaces G/H of compact Lie groups, where rkG=rkH, contains (2n,k)-manifolds that have non zero complexity. The results are demonstrated on the complex Grassmann manifolds Gk+1,q with an effective action of the torus Tk.