Some properties of the p-Bergman kernel and metric

Abstract

The p-Bergman kernel Kp(·) is shown to be of C1,1/2 for 1<p<∞. An unexpected relation between the off-diagonal p-Bergman kernel Kp(·,z) and certain weighted L2 Bergman kernel is given for 1 p 2. As applications, we show that for each 1 p 2, Kp(·,z)∈ Lq() for q< 2pn2n-α() and |Ks(z)-Kp(z)| |s-p|| |s-p|| whenever the hyperconvexity index α() is positive. Counterexamples for 2<p<∞ are given respectively. An optimal upper bound for the holomorphic sectional curvature of the p-Bergman metric when 2 p<∞ is obtained. For bounded C2 domains, it is shown that the Hardy space and the Bergman space satisfy Hp()⊂ Aq() where q=p(1+1n). A new concept so-called the p-Schwarz content is introduced. As applications, upper bounds of the Banach-Mazur distance between p-Bergman spaces are given, and Ap() is shown to be non-Chebyshev in Lp() for 0<p 1. For planar domains, we obtain a rigidity theorem for the p-Bergman kernel (which is not valid in high dimensional cases), and a characterization of non-isolated boundary points through completeness of the Narasimhan-Simha metric.