Off-diagonal decay of toric Bergman kernels

Abstract

We study the off-diagonal decay of Bergman kernels hk(z,w) and Berezin kernels Phk(z,w) for ample invariant line bundles over compact toric projective manifolds of dimension m. When the metric is real analytic, Phk(z,w) km - k D(z,w) where D(z,w) is the diastasis. When the metric is only C∞ this asymptotic cannot hold for all (z,w) since the diastasis is not even defined for all (z,w) close to the diagonal. We prove that for general C∞ metrics, Phk(z,w) km - k D(z,w) as long as w lies on the R+m-orbit of z, and for general (z,w), k ∞ 1k Phk(z,w) ≤ - D(z*,w*) where D(z, w*) is the diastasis between z and the translate of w by (S1)m to the R+m orbit of z, complementary to Mike Christ's negative results (arXiv:1308.5644).