Kobayashi hyperbolicity in degree > n2n
Abstract
For a generic hypersurface Xn-1 ⊂ Pn(C) of degree \[ d \,≥slant\, n2n \] (1) Pn Xn-1 is Kobayashi-hyperbolically imbedded in Pn; (2) Xn-1 is Kobayashi( Brody)-hyperbolic. (1) improves Brotbek-Deng 1804.01719: d ≥slant (n+2)n+3\, (n+1)n+3 = n2n\,n6\, (e3+ O(1n) ). (2) supersedes Demailly 1801.04765: d ≥slant 13\, ( e1(n-1) )2n = n2n\, e2n\, ( 13\, e2 + O (1n) ). The method gives in fact d ≥slant n2n constn for n ≥slant N( const) with any const > 1.
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