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Application of Hilbert's Projective Metric on Symmetric Cones
引用本文:Khalid KOUFANY. Application of Hilbert's Projective Metric on Symmetric Cones[J]. 数学学报(英文版), 2006, 22(5): 1467-1472. DOI: 10.1007/s10114-005-0755-6
作者姓名:Khalid KOUFANY
作者单位:Institut Elie Cartan, UMR 7502 (UHP-CNRS-INRIA), Université Henri Poincard (Nancy 1), B.P. 239, F-54506 Vandoeuvre-lès-Nancy Cedex, France
摘    要:Let Ω be a symmetric cone. In this note, we introduce Hilbert's projective metric on Ω in terms of Jordan algebras and we apply it to prove that, given a linear invertible transformation g such that g(Ω) = Ω and a real number p, |p| 〉 1, there exists a unique element x ∈ Ω satisfying g(x) = x^p.

关 键 词:Hilbert投影度量 均衡锥 Jordan代数 可逆转变换
收稿时间:2004-01-22
修稿时间:2004-01-222004-09-02

Application of Hilbert’s Projective Metric on Symmetric Cones
Khalid Koufany. Application of Hilbert’s Projective Metric on Symmetric Cones[J]. Acta Mathematica Sinica(English Series), 2006, 22(5): 1467-1472. DOI: 10.1007/s10114-005-0755-6
Authors:Khalid Koufany
Affiliation:(1) Institut Elie Cartan, UMR 7502 (UHP–CNRS–INRIA), Université Henri Poincaré (Nancy 1), 239, F-54506 Vandoeuvre-lès-Nancy Cedex, France
Abstract:Let Ω be a symmetric cone. In this note, we introduce Hilbert’s projective metric on Ω in terms of Jordan algebras and we apply it to prove that, given a linear invertible transformation g such that g(Ω) = Ω and a real number p, |p| > 1, there exists a unique element x ∈ Ω satisfying g(x) = x p .
Keywords:Hilbert’  s projective metric  Symmetric cone
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