Restricted tangent bundles for general free rational curves

Abstract

Suppose that X is a smooth projective variety and that C is a general member of a family of free rational curves on X. We prove several statements showing that the Harder-Narasimhan filtration of TX|C is approximately the same as the restriction of the Harder-Narasimhan filtration of TX with respect to the class of C. When X is a Fano variety, we prove that the set of all restricted tangent bundles for general free rational curves is controlled by a finite set of data. We then apply our work to analyze Peyre's "freeness" formulation of Manin's Conjecture in the setting of rational curves.