广义伯勒定理的一些变体及其应用

Dinh Tuan Huynh
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引用次数: 0

摘要

在本文的第一部分,我们围绕广义玻雷尔定理(generalizedBorel's Theorem)建立了一些结果。作为应用,在第二部分中,我们构造了$\mathbb{CP}^3$中度为$d\geq 19$的光滑曲面的例子,它的补集是超布尔嵌入$\mathbb{CP}^3$的。这改进了 Shirosaki 以前给出的度数约束 $d=31$ 的构造。在最后一部分,对于$\mathbb{CP}^n$中的费马-瓦林型超曲面$D$,由同次多项式 \[ \sum_{i=1}^m h_i^d, \] 定义,其中$m,n,d$为正整数,$mgeq 3n-1$,$dgeq m^2-m+1$、其中 $h_i$ 是 $\mathbb{C}^{n+1}$ 上的同素异形线性形式,对于非恒定全形函数 $f\colon\mathbb{C}\rightarrow\mathbb{CP}^n$ 而其图像不包含在 $D$ 的支持中,我们建立了第二主定理的类型估计:\[ \big(d-m(m-1)\big)\,T_f(r)\leq N_f^{[m-1]}(r,D)+S_f(r).\]这证明了 Shiffman-Zaidenberg 和 Siu-Yeung 的双曲性结果。
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Some variants of the generalized Borel Theorem and applications
In the first part of this paper, we establish some results around generalized Borel's Theorem. As an application, in the second part, we construct example of smooth surface of degree $d\geq 19$ in $\mathbb{CP}^3$ whose complements is hyperbolically embedded in $\mathbb{CP}^3$. This improves the previous construction of Shirosaki where the degree bound $d=31$ was gave. In the last part, for a Fermat-Waring type hypersurface $D$ in $\mathbb{CP}^n$ defined by the homogeneous polynomial \[ \sum_{i=1}^m h_i^d, \] where $m,n,d$ are positive integers with $m\geq 3n-1$ and $d\geq m^2-m+1$, where $h_i$ are homogeneous generic linear forms on $\mathbb{C}^{n+1}$, for a nonconstant holomorphic function $f\colon\mathbb{C}\rightarrow\mathbb{CP}^n$ whose image is not contained in the support of $D$, we establish a Second Main Theorem type estimate: \[ \big(d-m(m-1)\big)\,T_f(r)\leq N_f^{[m-1]}(r,D)+S_f(r). \] This quantifies the hyperbolicity result due to Shiffman-Zaidenberg and Siu-Yeung.
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