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- Gelfand–Mazur_theorem abstract "In operator theory, the Gelfand–Mazur theorem is a theorem named after Israel Gelfand and Stanisław Mazur which states:A complex Banach algebra, with unit 1, in which every nonzero element is invertible, is isometrically isomorphic to the complex numbers.In other words, the only complex Banach algebra that is a division algebra is the complex numbers C. This follows from the fact that, if A is a complex Banach algebra, the spectrum of an element a ∈ A is nonempty (which in turn is a consequence of the complex-analycity of the resolvent function). For every a ∈ A, there is some complex number λ such that λ1 − a is not invertible. By assumption, λ1 − a = 0. So a = λ · 1. This gives an isomorphism from A to C.Actually, a stronger and harder theorem was proved first by Stanisław Mazur alone, but it was published in France without a proof, when the author refused the editor's request to shorten his already short proof. Mazur's theorem states that there are (up to isomorphism) exactly three real Banach division algebras: the fields of reals R, of complex numbers C, and the division algebra of quaternions H. Gelfand proved (independently) the easier, special, complex version a few years later, after Mazur. However, it was Gelfand's work which influenced the further progress in the area.".
- Gelfand–Mazur_theorem wikiPageID "9129699".
- Gelfand–Mazur_theorem wikiPageLength "1838".
- Gelfand–Mazur_theorem wikiPageOutDegree "14".
- Gelfand–Mazur_theorem wikiPageRevisionID "590360113".
- Gelfand–Mazur_theorem wikiPageWikiLink Banach_algebra.
- Gelfand–Mazur_theorem wikiPageWikiLink Category:Banach_algebras.
- Gelfand–Mazur_theorem wikiPageWikiLink Category:Theorems_in_functional_analysis.
- Gelfand–Mazur_theorem wikiPageWikiLink Complex_number.
- Gelfand–Mazur_theorem wikiPageWikiLink Division_algebra.
- Gelfand–Mazur_theorem wikiPageWikiLink Inverse_element.
- Gelfand–Mazur_theorem wikiPageWikiLink Invertible.
- Gelfand–Mazur_theorem wikiPageWikiLink Isometry.
- Gelfand–Mazur_theorem wikiPageWikiLink Isomorphic.
- Gelfand–Mazur_theorem wikiPageWikiLink Isomorphism.
- Gelfand–Mazur_theorem wikiPageWikiLink Israel_Gelfand.
- Gelfand–Mazur_theorem wikiPageWikiLink Operator_theory.
- Gelfand–Mazur_theorem wikiPageWikiLink Resolvent_formalism.
- Gelfand–Mazur_theorem wikiPageWikiLink Spectrum_(functional_analysis).
- Gelfand–Mazur_theorem wikiPageWikiLink Stanisław_Mazur.
- Gelfand–Mazur_theorem wikiPageWikiLink Theorem.
- Gelfand–Mazur_theorem wikiPageWikiLinkText "Gelfand–Mazur theorem".
- Gelfand–Mazur_theorem hasPhotoCollection Gelfand–Mazur_theorem.
- Gelfand–Mazur_theorem wikiPageUsesTemplate Template:Citation.
- Gelfand–Mazur_theorem wikiPageUsesTemplate Template:Functional_Analysis.
- Gelfand–Mazur_theorem subject Category:Banach_algebras.
- Gelfand–Mazur_theorem subject Category:Theorems_in_functional_analysis.
- Gelfand–Mazur_theorem comment "In operator theory, the Gelfand–Mazur theorem is a theorem named after Israel Gelfand and Stanisław Mazur which states:A complex Banach algebra, with unit 1, in which every nonzero element is invertible, is isometrically isomorphic to the complex numbers.In other words, the only complex Banach algebra that is a division algebra is the complex numbers C.".
- Gelfand–Mazur_theorem label "Gelfand–Mazur theorem".
- Gelfand–Mazur_theorem sameAs Satz_von_Gelfand-Mazur.
- Gelfand–Mazur_theorem sameAs Théorème_de_Gelfand-Mazur.
- Gelfand–Mazur_theorem sameAs Teorema_di_Gelfand-Mazur.
- Gelfand–Mazur_theorem sameAs ゲルファント=マズールの定理.
- Gelfand–Mazur_theorem sameAs 겔판트-마주르_정리.
- Gelfand–Mazur_theorem sameAs m.027yrpg.
- Gelfand–Mazur_theorem sameAs Gelfand–Mazurs_sats.
- Gelfand–Mazur_theorem sameAs Q2226677.
- Gelfand–Mazur_theorem sameAs Q2226677.
- Gelfand–Mazur_theorem wasDerivedFrom Gelfand–Mazur_theorem?oldid=590360113.
- Gelfand–Mazur_theorem isPrimaryTopicOf Gelfand–Mazur_theorem.