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- Carathéodory_kernel_theorem abstract "In mathematics, the Carathéodory kernel theorem is a result in complex analysis and geometric function theory established by the Greek mathematician Constantin Carathéodory in 1912. The uniform convergence on compact sets of a sequence of holomorphic univalent functions, defined on the unit disk in the complex plane and fixing 0, can be formulated purely geometrically in terms of the limiting behaviour of the images of the functions. The kernel theorem has wide application in the theory of univalent functions and in particular provides the geometric basis for the Loewner differential equation.".
- Carathéodory_kernel_theorem wikiPageID "34145780".
- Carathéodory_kernel_theorem wikiPageRevisionID "569334927".
- Carathéodory_kernel_theorem subject Category:Theorems_in_complex_analysis.
- Carathéodory_kernel_theorem comment "In mathematics, the Carathéodory kernel theorem is a result in complex analysis and geometric function theory established by the Greek mathematician Constantin Carathéodory in 1912. The uniform convergence on compact sets of a sequence of holomorphic univalent functions, defined on the unit disk in the complex plane and fixing 0, can be formulated purely geometrically in terms of the limiting behaviour of the images of the functions.".
- Carathéodory_kernel_theorem label "Carathéodory kernel theorem".
- Carathéodory_kernel_theorem sameAs Carath%C3%A9odory_kernel_theorem.
- Carathéodory_kernel_theorem sameAs Q5037754.
- Carathéodory_kernel_theorem sameAs Q5037754.
- Carathéodory_kernel_theorem wasDerivedFrom Carathéodory_kernel_theorem?oldid=569334927.