Algebraic fibre spaces with strictly nef relative anti-log canonical divisor

Abstract

Let (X,) be a projective klt pair, and f:X Y a fibration to a smooth projective variety Y with strictly nef relative anti-log canonical divisor -(KX/Y+). We prove that f is a locally constant fibration with rationally connected fibres, and the base Y is a canonically polarized hyperbolic projective manifold. In particular, when Y is a single point, we establish that X is rationally connected. Moreover, when X=3 and -(KX+) is strictly nef, we prove that -(KX+) is ample, which confirms the singular version of a conjecture of Campana-Peternell for threefolds.