Equivariant Bordism of 2-Torus Manifolds and Unitary Toric Manifolds

Abstract

The equivariant bordism classification of manifolds with group actions is an essential subject in the study of transformation groups. We are interesting in the action of 2-torus group Z2n and torus group Tn, and study the equivariant bordism of 2-torus manifolds and unitary toric manifolds. In this paper, we give a new description of the group Zn(Z2n) of 2-torus manifolds, and determine the dimention of Zn(Z2n) as a Z2-vector space. With the help of toric topology, L\"u and Tan proved that the bordism groups Zn(Z2n) are generated by small covers. We will give a new proof to this result. These results can be generalized to the equivariant bordism of unitary toric manifolds, that is, we will give a new description of the group ZnU(Tn) of unitary torus manifolds, and prove that ZnU(Tn) can be generated by quasitoric manifolds with omniorientations.