A note on smoothing properties of the Bergman projection
classification
🧮 math.CV
keywords
bergmanholomorphicprojectionboundaryconjugatedomainsfunctionssmoothing
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Recently Herbig, McNeal, and Straube have showed that the Bergman projection of conjugate holomorphic functions is smooth up to the boundary on a class of pseudoconvex domains. We show that a further smoothing property holds on a family of Reinhardt domains; namely, the Bergman projection of conjugate holomorphic functions is holomorphic past the boundary.
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