Some variants of the generalized Borel Theorem and applications
Abstract
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≥ 19 in CP3 whose complements is hyperbolically embedded in CP3. 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 CPn defined by the homogeneous polynomial \[ Σi=1m hid, \] where m,n,d are positive integers with m≥ 3n-1 and d≥ m2-m+1, where hi are homogeneous generic linear forms on Cn+1, for a nonconstant holomorphic function f→CPn whose image is not contained in the support of D, we establish a Second Main Theorem type estimate: \[ (d-m(m-1))\,Tf(r)≤ Nf[m-1](r,D)+Sf(r). \] This quantifies the hyperbolicity result due to Shiffman-Zaidenberg and Siu-Yeung.
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