A conformal mapping technique for infinitely connected regions /

Methods of classical analysis devised originally for the disc are here extended to more general plane regions by the use of Green's lines, the Green's mapping, and an ideal boundary structure generalizing the prime-end structure of Carathéodory. The regions admitted include all bounded fi...

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Detalles Bibliográficos
Clasificación:Libro Electrónico
Autores principales: Arsove, Maynard, 1922-, Johnson, Guy, Jr., 1922-2017 (Autor)
Formato: Electrónico eBook
Idioma:Inglés
Publicado: Providence : American Mathematical Society, 1970.
Colección:Memoirs of the American Mathematical Society ; no. 91.
Temas:
Conformal mapping.
Poisson integral formula.
Dirichlet problem.
Boundary value problems.
Mathematical analysis.
Applications conformes.
Problème de Dirichlet.
Problèmes aux limites.
Analyse mathématique.
Poisson integral formula
Mathematical analysis
Dirichlet problem
Boundary value problems
Conformal mapping
Acceso en línea:Texto completo
Descripción
Sumario:Methods of classical analysis devised originally for the disc are here extended to more general plane regions by the use of Green's lines, the Green's mapping, and an ideal boundary structure generalizing the prime-end structure of Carathéodory. The regions admitted include all bounded finitely connected regions, as well as a broad class of infinitely connected regions. Since certain modifications in the Brelot-Choquet theory are needed to allow for singular Green's lines, an independent development of the theory of Green's lines is given, based on properties of the Green's mapping. These techniques make possible the introduction of a generalized Poisson kernel and integral defined in terms of Green's lines.
Descripción Física:1 online resource (60 pages) : illustrations
Bibliografía:Includes bibliographical references (page 56).
ISBN:9781470400415
1470400413

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