Normal Bundles of Rational Normal Curves on Hypersurfaces

Abstract

Let C be the rational normal curve of degree e in Pn, and let X⊂ Pn be a degree d 2 hypersurface containing C. In previous work, I. Coskun and E. Riedl showed that the normal bundle NC/X is balanced for a general X. H. Larson studied the case of lines (e=1) and computed the dimension of the space of hypersurfaces for which NC/X has a given splitting type. In this paper, we work with any e 2. We compute explicit examples of hypersurfaces for all possible splitting types, and for d 3, we compute the dimension of the space of hypersurfaces for which NC/X has a given splitting type. For d=2, we give a lower bound on the maximum rank of quadrics with fixed splitting type.