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Regularity of the Bergman Projection on Variants of the Hartogs Triangle

出版	Washington University, 2015
URL	http://books.google.com.hk/books?id=NzJeAQAACAAJ&hl=&source=gbs_api

註釋The Bergman projection is the orthogonal projection from the space of square integrable functions onto the space of square integrable holomorphic functions on a domain. Initially, the projection is defined on the L2 space, but its behavior on other function spaces, e.g. Lp, Sobolev and Hölder spaces, is of considerable interest. In this dissertation, we focus on the Hartogs triangle which is a classical source of counterexamples in several complex variables, and generalize it to higher dimensions. We investigate the Lp mapping properties of the weighted Bergman projections on these Hartogs domains. As applications, we obtain the Lp regularity of the twisted-weighted Bergman projections and the weighted Lp Sobolev regularity of the ordinary Bergman projection on the corresponding domains.