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- Glaesers_composition_theorem abstract "In mathematics, Glaeser's theorem, introduced by Georges Glaeser (1963), is a theorem giving conditions for a smooth function to be a composition of F and θ for some given smooth function θ. One consequence is a generalization of Newton's theorem that every symmetric polynomial is a polynomial in the elementary symmetric polynomials, from polynomials to smooth functions.".
- Glaesers_composition_theorem wikiPageID "37595113".
- Glaesers_composition_theorem wikiPageLength "883".
- Glaesers_composition_theorem wikiPageOutDegree "7".
- Glaesers_composition_theorem wikiPageRevisionID "675111751".
- Glaesers_composition_theorem wikiPageWikiLink Annals_of_Mathematics.
- Glaesers_composition_theorem wikiPageWikiLink Category:Theorems_in_real_analysis.
- Glaesers_composition_theorem wikiPageWikiLink Elementary_symmetric_polynomial.
- Glaesers_composition_theorem wikiPageWikiLink Function_composition.
- Glaesers_composition_theorem wikiPageWikiLink Newtons_identities.
- Glaesers_composition_theorem wikiPageWikiLink Smoothness.
- Glaesers_composition_theorem wikiPageWikiLink Symmetric_polynomial.
- Glaesers_composition_theorem wikiPageWikiLinkText "Glaeser's composition theorem".
- Glaesers_composition_theorem authorlink "Georges Glaeser".
- Glaesers_composition_theorem first "Georges".
- Glaesers_composition_theorem last "Glaeser".
- Glaesers_composition_theorem wikiPageUsesTemplate Template:Citation.
- Glaesers_composition_theorem wikiPageUsesTemplate Template:Harvs.
- Glaesers_composition_theorem wikiPageUsesTemplate Template:Mathanalysis-stub.
- Glaesers_composition_theorem year "1963".
- Glaesers_composition_theorem subject Category:Theorems_in_real_analysis.
- Glaesers_composition_theorem hypernym Theorem.
- Glaesers_composition_theorem comment "In mathematics, Glaeser's theorem, introduced by Georges Glaeser (1963), is a theorem giving conditions for a smooth function to be a composition of F and θ for some given smooth function θ. One consequence is a generalization of Newton's theorem that every symmetric polynomial is a polynomial in the elementary symmetric polynomials, from polynomials to smooth functions.".
- Glaesers_composition_theorem label "Glaeser's composition theorem".
- Glaesers_composition_theorem sameAs Q5566480.
- Glaesers_composition_theorem sameAs m.0nd4l7p.
- Glaesers_composition_theorem sameAs Glaesers_sammansättningssats.
- Glaesers_composition_theorem sameAs Q5566480.
- Glaesers_composition_theorem wasDerivedFrom Glaesers_composition_theorem?oldid=675111751.
- Glaesers_composition_theorem isPrimaryTopicOf Glaesers_composition_theorem.