Test Configurations for K-Stability and Geodesic Rays

Abstract

Let X be a compact complex manifold, L X an ample line bundle over X, and H the space of all positively curved metrics on L. We show that a pair (h0,T) consisting of a point h0∈ H and a test configuration T=( L X C), canonically determines a weak geodesic ray R(h0,T) in H which emanates from h0. Thus a test configuration behaves like a vector field on the space of K\"ahler potentials H. We prove that R is non-trivial if the C× action on X0, the central fiber of X, is non-trivial. The ray R is obtained as limit of smooth geodesic rays Rk⊂ Hk, where Hk⊂ H is the subspace of Bergman metrics.

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