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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 wikiPageExternalLink ?PPN=GDZPPN002274736.
- Hartogs–Rosenthal_theorem wikiPageID "33183251".
- Hartogs–Rosenthal_theorem wikiPageLength "2729".
- Hartogs–Rosenthal_theorem wikiPageOutDegree "23".
- Hartogs–Rosenthal_theorem wikiPageRevisionID "675185516".
- Hartogs–Rosenthal_theorem wikiPageWikiLink American_Mathematical_Society.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Arthur_Rosenthal.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Category:Rational_functions.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Category:Theorems_in_approximation_theory.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Category:Theorems_in_complex_analysis.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Cauchy_integral_formula.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Cauchys_integral_formula.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Complex_analysis.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Complex_plane.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Friedrich_Hartogs.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Graduate_Studies_in_Mathematics.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Graduate_Texts_in_Mathematics.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Lebesgue_measure.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Mathematics.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Mathematische_Annalen.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Mergelyans_theorem.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Operator_theory.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Rational_function.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Riemann_sum.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Runges_theorem.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Smooth_function.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Smoothness.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Stone–Weierstrass_theorem.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Uniform_approximation.
- Hartogs–Rosenthal_theorem wikiPageWikiLink Uniform_convergence.
- Hartogs–Rosenthal_theorem wikiPageWikiLinkText "Hartogs–Rosenthal theorem".
- Hartogs–Rosenthal_theorem hasPhotoCollection Hartogs–Rosenthal_theorem.
- Hartogs–Rosenthal_theorem wikiPageUsesTemplate Template:Citation.
- Hartogs–Rosenthal_theorem wikiPageUsesTemplate Template:Reflist.
- 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 m.0h693t2.
- Hartogs–Rosenthal_theorem sameAs Q5675112.
- Hartogs–Rosenthal_theorem sameAs Q5675112.
- Hartogs–Rosenthal_theorem wasDerivedFrom Hartogs–Rosenthal_theorem?oldid=675185516.
- Hartogs–Rosenthal_theorem isPrimaryTopicOf Hartogs–Rosenthal_theorem.