Titlebook: Complex Analysis in One Variable; Raghavan Narasimhan,Yves Nievergelt Textbook 2001Latest edition Birkh?user Boston 2001 Meromorphic funct

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https://doi.org/10.1007/978-1-4842-1239-4The following exercises provide some practice with manifolds that arise frequently in mathematics. The exercises for Chapter 9 contain other examples amenable to the methods from Chapter 2.

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https://doi.org/10.1007/978-1-4302-2498-3. Prove that for each compact subset . ? ? the complement ? . has exactly one unbounded connected component.

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Picard’s TheoremIn this chapter, we shall prove the so-called “big” theorem of Picard which asserts that a holomorphic function with an (isolated) essential singularity assumes every value with at most one exception in any neighborhood of that singularity.

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Applications of Runge’s TheoremThis chapter is devoted to various theorems which can be proved using Runge’s theorem: the existence of functions with prescribed zeros or poles, a “cohomological” version of Cauchy’s theorem, and related theorems. The last section concerns itself with .(Ω) as a ring (or ?-algebra).

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