Non-free sections of Fano fibrations

Abstract

Let B be a smooth projective curve and let π: X B be a smooth integral model of a geometrically integral Fano variety over K(B). Geometric Manin's Conjecture predicts the structure of the irreducible components M ⊂ Sec(X/B) which parametrize non-relatively free sections of sufficiently large anticanonical degree. Over the complex numbers, we prove that for any such component M the sections come from morphisms f: Y X such that the generic fiber of Y has Fujita invariant ≥ 1. Furthermore, we prove that there is a bounded family of morphisms f which together account for all such components M. These results verify the first part of Batyrev's heuristics for Geometric Manin's Conjecture over C. Our result has ramifications for Manin's Conjecture over global function fields: if we start with a Fano fibration over a number field and reduce mod p, we obtain upper bounds of the desired form by first letting the prime go to infinity, then the height.