Degrees d ≥slant ( n\, \, n)n and d ≥slant ( n\, \, n)n in the Conjectures of Green-Griffiths and of Kobayashi

Abstract

Once first answers in any dimension to the Green-Griffiths and Kobayashi conjectures for generic algebraic hypersurfaces Xn-1 ⊂ Pn(C) have been reached, the principal goal is to decrease (to improve) the degree bounds, knowing that the `celestial' horizon lies near d ≥slant 2n. For Green-Griffiths algebraic degeneracy of entire holomorphic curves, we obtain: \[ d \,≥slant\, (n\, log\,n)n, \] and for Kobayashi-hyperbolicity (constancy of entire curves), we obtain: \[ d \,≥slant\, (n\, log\,n)n. \] The latter improves d ≥slant n2n obtained by Merker in arxiv.org/1807/11309/. Admitting a certain technical conjecture I0 ≥slant I0, the method employed (Diverio-Merker-Rousseau, B\'erczi, Darondeau) conducts to constant power n, namely to: \[ d\ ,≥slant\, 25n and, respectively, to: d \,≥slant\, 45n. \] In Spring 2019, a forthcoming prepublication based on intensive computer explorations will present several subconjectures supporting the belief that I0 ≥slant I0, a conjecture which will be established up to dimension n = 50.