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- Hartogs–Rosenthal_theorem abstract "In mathematics, the Hartogs–Rosenthal theorem is a classical result in complex analysis on the uniform approximation of continuous functions on compact subsets of the complex plane by rational functions. The theorem was proved in 1931 by the German mathematicians Friedrich Hartogs and Arthur Rosenthal and has been widely applied, particularly in operator theory.".
- Hartogs–Rosenthal_theorem wikiPageID "33183251".
- Hartogs–Rosenthal_theorem wikiPageRevisionID "569391434".
- Hartogs–Rosenthal_theorem subject Category:Rational_functions.
- Hartogs–Rosenthal_theorem subject Category:Theorems_in_approximation_theory.
- Hartogs–Rosenthal_theorem subject Category:Theorems_in_complex_analysis.
- Hartogs–Rosenthal_theorem comment "In mathematics, the Hartogs–Rosenthal theorem is a classical result in complex analysis on the uniform approximation of continuous functions on compact subsets of the complex plane by rational functions. The theorem was proved in 1931 by the German mathematicians Friedrich Hartogs and Arthur Rosenthal and has been widely applied, particularly in operator theory.".
- Hartogs–Rosenthal_theorem label "Hartogs–Rosenthal theorem".
- Hartogs–Rosenthal_theorem sameAs Hartogs%E2%80%93Rosenthal_theorem.
- Hartogs–Rosenthal_theorem sameAs Q5675112.
- Hartogs–Rosenthal_theorem sameAs Q5675112.
- Hartogs–Rosenthal_theorem wasDerivedFrom Hartogs–Rosenthal_theorem?oldid=569391434.