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1Introduction
2Preliminaries
3Holomorphic Vector Bundles on Hopf Surfaces
Topologically trivial holomorphic vector bundles
Construction rank-2 vector bundles
Moduli spaces
Filtrable rank-2 vector bundles

1Introduction

2Preliminaries

3Holomorphic Vector Bundles on Hopf Surfaces

Topologically trivial holomorphic vector bundles

命题 3.1. On a Hopf surface $X$ , topologically trivial holomorphic vector bundles of rank greater than $1$ are not simple.

由 [1, p21, Remark 1.1.7], 全纯向量丛

(E, δ)

(

δ

是全纯结构) 被称为 simple 若全纯自同态都是数乘, 即

H^{0} (X, End (E)) = C \cdot id_{E}

.

推论 3.2. Any topologically trivial holomorphic vector bundle on a Hopf surface $X$ possesses a filtration by vector bundles.

注 3.3. [2, Structure Theorem 3.2]: Let $X$ be an arbitrary Hopf manifold of dimension $n \geq 3$ or a diagonal Hopf surface.

If $E$ is a holomorphic vector bundle or rank $r$ on $X$ , then the following statements are equivalent:

•	$π^{*} (E) ≅ O_{W}^{r}$
•	$E$ possesses a filtration by vector bundles $0 \subset E^{1} \subset \dots \subset E^{r - 1} \subset E^{r} = E$ with $E^{i}$ of rank $i$ .

命题 3.4. Let $E$ be an extension of line bundles on $X$ . Then, there exists an exact sequence $0 \to L_{a} \to E \to L_{b} \to 0$ with $a, b \in C^{*}$ . We have the following possibilities:

•	If $a = b μ_{1}^{m_{1}} μ_{2}^{m_{2}}$ , for non-negative integres $m_{1}$ and $m_{2}$ , then $E = L_{a} \oplus L_{b}$ or $E$ is the unique non-trivial extension;
•	If $a b^{- 1} \neq = μ_{1}^{m_{1}} μ_{2}^{m_{2}}$ for all integers $m_{1}, m_{2} \geq 0$ , then $E = L_{a} \oplus L_{b}$ .

Construction rank-2 vector bundles

•	Double covers: 任何向量丛都可以这么构造吗?
•	Serre construction.

Moduli spaces

non-filtrable bundles are automatically stable.

Filtrable rank-2 vector bundles

Consider a filtrable rank-2 vector bundle $E$ on $X$ with $c_{2} (E) = c_{2} > 0$ . It can therefore expressed as an extension of the form: $0 \to L_{a} \to E \to L_{b} \otimes I_{Z} \to 0$

定理 3.5.

命题 3.6. Let $E$ be a stable filtrable rank-2 vector bundle on $X$ with determinant $δ$ and a jump of multiplicity $1$ on $T_{1}$ . Then, $E$ is uniquely determined by a triple $(a, λ, p)$ such that $(a, λ) \in D_{1, 0} \times Pic^{1} (T_{1})$

[1]	M.Lubke, A.Teleman(1995): The Kobayashi-Hitchin Correspondence.
[2]	D.Mall(1992) On holomorphic vector bundles on Hopf manifolds with pullback on the universal covering

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