Entire holomorphic curves into Pn(C) intersecting n+1 general hypersurfaces
Abstract
Let \Di\i=1n+1 be n+1 hypersurfaces in Pn(C) with total degrees Σi=1n+1 Di≥slant n+2, in general position and satisfying a generic geometric condition: every n hypersurfaces intersect only at smooth points and the intersection is transversal. Then, for every algebraically nondegenerate entire holomorphic curve f→Pn(C), we show a Second Main Theorem: Σi=1n+1 δf(Di) < n+1 in terms of defect inequality in Nevanlinna theory. This is the first result in the literature on Second Main Theorem for n+1 general hypersurfaces in Pn(C) with optimal total degrees.
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