Clustered families and applications to Lang-type conjectures

Abstract

We introduce and classify 1-clustered families of linear spaces in the Grassmannian G(k-1,n) and give applications to Lang-type conjectures. Let X ⊂ Pn be a very general hypersurface of degree d. Let ZL be the locus of points contained in a line of X. Let Z2 be the locus of points on X that are swept out by lines that meet X in at most 2 points. We prove that 1) If d ≥ 3n+22, then X is algebraically hyperbolic outside ZL. 2) If d ≥ 3n2, X contains lines but no other rational curves 3) If d ≥ 3n+32, then the only points on X that are rationally Chow zero equivalent to points other than themselves are contained in Z2. 4) If d ≥ 3n+22 and a relative Green-Griffiths-Lang Conjecture holds, then the exceptional locus for X is contained in Z2.