Normal bundles of lines on hypersurfaces

Abstract

Let X ⊂ Pn be a smooth hypersurface. Given a sequence of integers a = (a1, …, an-2) with a1 ≤ ·s ≤ an-2, let Fa(X) be the parameter space of lines L on X such that NL/X O(a1) ·s O(an-2). The loci Fa(X) form a stratification of the Fano scheme of lines on X. We show that for general hypersurfaces, the Fa(X) have the expected dimension and, in this case, compute the class of Fa(X) in the Chow ring of the Grassmannian of lines in Pn. For certain splitting types a, we also provide non-trivial upper bounds on the dimension of Fa(X) that hold for all smooth X.