Regularity of the p-Bergman kernel
Abstract
We show that the p-Bergman kernel Kp(z) on a bounded domain is of locally C1,1 for p≥1.The proof is based on the locally Lipschitz continuity of the off-diagonal p-Bergman kernel Kp(ζ,z) for fixed ζ∈ . Global irregularity of Kp(ζ,z) is presented for some smooth strongly pseudoconvex domains when p 1. As an application of the local C1,1-regularity, an upper estimate for the Levi form of Kp(z) for 1<p<2 is provided. Under the condition that the hyperconvexity index of is positive, we obtain the log-Lipschitz continuity of pKp(z) for 1≤p≤2.
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