|
| |
Equivariant Chern Classes of Orientable ToricOrigami Manifolds∗ |
| |
Citation: |
Yueshan XIONG,Haozhi ZENG.Equivariant Chern Classes of Orientable ToricOrigami Manifolds∗[J].Chinese Annals of Mathematics B,2024,45(2):221~234 |
Page view: 1121
Net amount: 517 |
Authors: |
Yueshan XIONG; Haozhi ZENG |
Foundation: |
This work was supported by the National Natural Science Foundation of China (Nos. 11801186,
11901218). |
|
|
Abstract: |
A toric origami manifold, introduced by Cannas da Silva, Guillemin and Pires,
is a generalization of a toric symplectic manifold. For a toric symplectic manifold, its
equivariant Chern classes can be described in terms of the corresponding Delzant polytope
and the stabilization of its tangent bundle splits as a direct sum of complex line bundles.
But in general a toric origami manifold is not simply connected, so the algebraic topology
of a toric origami manifold is more difficult than a toric symplectic manifold. In this paper
they give an explicit formula of the equivariant Chern classes of an oriented toric origami
manifold in terms of the corresponding origami template. Furthermore, they prove the
stabilization of the tangent bundle of an oriented toric origami manifold also splits as a
direct sum of complex line bundles. |
Keywords: |
Equivariant Chern classes, Toric origami manifolds, Unitary structures,
Spin structures |
Classification: |
55R40, 55N91, 53D05, 57S12 |
|
Download PDF Full-Text
|
|
|
|