Discriminants and Higher K-energies on Polarized K\"ahler Manifolds

Abstract

Given a compact polarized K\"ahler manifold XN, the space of Bergman metrics on X, parameterized by SL(N+1,C), corresponds to a dense set in the space of K\"ahler potentials in the K\"ahler class as N∞. Critical points of the kth K-energy functional, which is defined on the K\"ahler class, correspond to metrics with harmonic kth Chern form. In this paper it is shown that the higher K-energy functionals, when restricted to the Bergman metrics, are expressible as the energies of certain pairs of vectors (tensors products of discriminants). Consequentially, we obtain results on the asymptotic behavior of these functionals along 1-parameter subgroups and their boundedness properties.