L2-Sobolev Theory for ∂ on Domains in CPn
Abstract
In this article, we study the range of the Cauchy-Riemann operator ∂ on domains in the complex projective space CPn. In particular, we show that ∂ does not have closed range in L2 for (2,1)-forms on the Hartogs triangle in CP2. We also study the ∂-Cauchy problem on pseudoconvex domains and use it to prove the Sobolev estimates for ∂ on pseudoconcave domains in CPn.
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