Kaplansky Density and Kadison Transitivity Theorems for Irreducible Representations of Real C^-Algebras

Kaplansky Density and Kadison Transitivity Theorems for Irreducible Representations of Real C-Algebras

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摘要 We prove analogs of the Kaplansky Density Theorem and the Kadison Transitivity Theorem for irreducible representations of a real C＊-algebra on a real Hilbert space. Specifically, if a C＊-algebra is acting irreducibly on a real Hilbert space, then the Hilbert space has either a real, complex, or quaternionic structure with respect to which the density and transitivity theorems hold. We prove analogs of the Kaplansky Density Theorem and the Kadison Transitivity Theorem for irreducible representations of a real C＊-algebra on a real Hilbert space. Specifically, if a C＊-algebra is acting irreducibly on a real Hilbert space, then the Hilbert space has either a real, complex, or quaternionic structure with respect to which the density and transitivity theorems hold.

作者 Jeffrey L.BOERSEMA

机构地区 Department of Mathematics

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2007年第10期1827-1832,共6页 数学学报（英文版）

关键词 real C＊-algebra irreducible ＊ representation TRANSITIVITY real C＊-algebra, irreducible ＊ representation, transitivity

分类号 O177.5 [理学—基础数学]

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Acta Mathematica Sinica,English Series

2007年第10期

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Kaplansky Density and Kadison Transitivity Theorems for Irreducible Representations of Real C^-Algebras

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