Titlebook: Geometric Analysis of the Bergman Kernel and Metric; Steven G. Krantz Textbook 2013 Springer Science+Business Media New York 2013 Bergman

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The Group Experience of Migrant Criminals,s us that a connected open set (a .) is a domain of holomorphy if and only if it is pseudoconvex. For us, in the present book, pseudoconvexity is . pseudoconvexity; this is defined in terms of the positive semi-definiteness of the Levi form.

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Elisabeth Staksrud,Kjartan ólafssoning theorem (at least in the traditional sense) in several complex variables. More recent results of Burns, Shnider, and Wells [BSW] and of Greene and Krantz [GRK1, GRK2] confirm how truly dismal the situation is. First, we need a definition.

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Further Geometric Explorations,composition of mappings. The standard topology on this group is uniform convergence on compact sets, or the compact-open topology. We denote the automorphism group by .. When . is a bounded domain, the group . is a real (never a complex) Lie group.

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Additional Analytic Topics,s us that a connected open set (a .) is a domain of holomorphy if and only if it is pseudoconvex. For us, in the present book, pseudoconvexity is . pseudoconvexity; this is defined in terms of the positive semi-definiteness of the Levi form.

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https://doi.org/10.1007/978-1-4614-7924-6Bergman kernel; Bergman metric; Bergman theory; applications to Bergman; holomorphic mapping; integral fo

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