Morse theory and geodesics in the space of K\"ahler metrics

Abstract

Given a compact K\"ahler manifold (X,ω0) let H0 be the set of K\"ahler forms cohomologous to ω0. As observed by Mabuchi m, this space has the structure of an infinite dimensional Riemannian manifold, if one identifies it with a totally geodesic subspace of H, the set of K\"ahler potentials of ω0. Following Donaldson's research program, existence and regularity of geodesics in this space is of fundamental interest. In this paper, supposing enough regularity of a geodesic u:[0,1] H, connecting u0 ∈ H with u1 ∈ H, we establish a Morse theoretic result relating the critical points of u1-u0 to the critical points of u0 = du/dt|t=0. As an application of this result, we prove that on all K\"ahler manifolds, connecting K\"ahler potentials with smooth geodesics is not possible in general. In particular, in the case X ≠ C P1, we will also prove that the set of pairs of potentials that can not be connected with smooth geodesics has nonempty interior. This is an improvement upon the findings of lv and dl.