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- Earle%E2%80%93Hamilton_fixed-point_theorem abstract "In mathematics, the Earle–Hamilton fixed point theorem is a result in geometric function theory giving sufficient conditions for a holomorphic mapping of an open domain in a complex Banach space into itself to have a fixed point. The result was proved in 1968 by Clifford Earle and Richard Hamilton by showing that, with respect to the Carathéodory metric on the domain, the holomorphic mapping becomes a contraction mapping to which the Banach fixed-point theorem can be applied.".
- Earle%E2%80%93Hamilton_fixed-point_theorem wikiPageExternalLink abs.
- Earle%E2%80%93Hamilton_fixed-point_theorem wikiPageID "36187009".
- Earle%E2%80%93Hamilton_fixed-point_theorem wikiPageRevisionID "638358556".
- Earle%E2%80%93Hamilton_fixed-point_theorem hasPhotoCollection Earle–Hamilton_fixed-point_theorem.
- Earle%E2%80%93Hamilton_fixed-point_theorem subject Category:Fixed-point_theorems.
- Earle%E2%80%93Hamilton_fixed-point_theorem subject Category:Theorems_in_complex_analysis.
- Earle%E2%80%93Hamilton_fixed-point_theorem comment "In mathematics, the Earle–Hamilton fixed point theorem is a result in geometric function theory giving sufficient conditions for a holomorphic mapping of an open domain in a complex Banach space into itself to have a fixed point. The result was proved in 1968 by Clifford Earle and Richard Hamilton by showing that, with respect to the Carathéodory metric on the domain, the holomorphic mapping becomes a contraction mapping to which the Banach fixed-point theorem can be applied.".
- Earle%E2%80%93Hamilton_fixed-point_theorem label "Earle–Hamilton fixed-point theorem".
- Earle%E2%80%93Hamilton_fixed-point_theorem sameAs m.0k0p88k.
- Earle%E2%80%93Hamilton_fixed-point_theorem wasDerivedFrom Earle–Hamilton_fixed-point_theorem?oldid=638358556.
- Earle%E2%80%93Hamilton_fixed-point_theorem isPrimaryTopicOf Earle–Hamilton_fixed-point_theorem.