On the splitting type of an equivariant vector bundle over a toric manifold

Chien-Hao Liu Shing-Tung Yau

Algebraic Geometry mathscidoc:1912.43683

arXiv preprint math/0002031, 2000.2
From the work of Lian, Liu, and Yau on" Mirror Principle", in the explicit computation of the Euler data Q=\{Q_0, Q_1,...\} for an equivariant concavex bundle Q=\{Q_0, Q_1,...\} over a toric manifold, there are two places the structure of the bundle comes into play:(1) the multiplicative characteric class Q=\{Q_0, Q_1,...\} of Q=\{Q_0, Q_1,...\} one starts with, and (2) the splitting type of Q=\{Q_0, Q_1,...\} . Equivariant bundles over a toric manifold has been classified by Kaneyama, using data related to the linearization of the toric action on the base toric manifold. In this article, we relate the splitting type of Q=\{Q_0, Q_1,...\} to the classifying data of Kaneyama. From these relations, we compute the splitting type of a couple of nonsplittable equivariant vector bundles over toric manifolds that may be of interest to string theory and mirror symmetry. A code in Mathematica that carries out the computation of some of these examples is attached.
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@inproceedings{chien-hao2000on,
  title={On the splitting type of an equivariant vector bundle over a toric manifold},
  author={Chien-Hao Liu, and Shing-Tung Yau},
  url={http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20191224204955685666247},
  booktitle={arXiv preprint math/0002031},
  year={2000},
}
Chien-Hao Liu, and Shing-Tung Yau. On the splitting type of an equivariant vector bundle over a toric manifold. 2000. In arXiv preprint math/0002031. http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20191224204955685666247.
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