Central Limit theorem for toric manifolds

Abstract

Associated to the Bergman kernels of a polarized toric manifold (M, ω, L, h) are sequences of measures \μkz\k=1∞ parametrized by the points z ∈ M. For each z in the open orbit, we prove a central limit theorem for μkz. The center of mass of μkz is the image of z under the moment map; after re-centering at 0 and dilating by k, the re-normalized measure tends to a centered Gaussian whose variance is the Hessian of the potential at z. We further give a remainder estimate of Berry-Esseen type. The sequence \μkz\ is generally not a sequence of convolution powers and the proofs only involve analysis.