21 research outputs found

    Localization of compactness of Hankel operators on pseudoconvex domains

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    We prove the following localization for compactness of Hankel operators on Bergman spaces. Assume that D is a bounded pseudoconvex domain in C^n, p is a boundary point of D and B(p,r) is a ball centered at p with radius r so that U=D\cap B(p,r) is connected. We show that if the Hankel operator H^D_f is compact on A^2(D) (the symbols f is C^1 on the closure of D) then H^U_f is compact on A^2(U) where A^2(D) and A^2(U) denote the Bergman spaces on D and U, respectively.Comment: 9 pages. To appear in Illinois J. Mat

    Irregularity of the Bergman projection on worm domains in C^n

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    We construct higher-dimensional versions of the Diederich-Fornaess worm domains and show that the Bergman projection operators for these domains are not bounded on high-order LpL^p-Sobolev spaces for 1≀p<∞.1\leq p<\infty.Comment: some typos are corrected, to appear in Michigan Math.
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