LOWER BOUNDS ON FIBERED YANG–MILLS FUNCTIONALS: GENERIC NEFNESS AND SEMISTABILITY OF DIRECT IMAGES

The main goal of this paper is to generalize a part of the relationship between mean curvature and Harder–Narasimhan filtrations of holomorphic vector bundles to arbitrary polarized fibrations. More precisely, for a polarized family of complex projective manifolds, we establish lower bounds on a fibered version of Yang–Mills functionals in terms of the Harder–Narasimhan slopes of direct image sheaves associated with high tensor powers of the polarization. We discuss the optimality of these lower bounds and, as an application, provide an analytic characterisation of a fibered version of generic nefness. As another application, we refine the existent obstructions for finding metrics with constant horizontal mean curvature. The study of the semiclassical limit of Hermitian Yang–Mills functionals lies at the heart of our approach.