A note on L2 boundary integrals of the Bergman kernel
Abstract
For any bounded convex domain with C2 boundary in Cn, we show that there exist positive constants C1 and C2 such that \[ C1K(w,w)δ(w)≤ K(·,w) L2(∂)≤ C2K(w,w)δ(w), \] for any w∈. Here K is the Bergman kernel of , and δ is the distance-to-boundary function.
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