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CHARACTERIZATIONS OF JORDAN +-SKEW MULTIPLICATIVE MAPS ON OPERATOR ALGEBRAS OF INDEFINITE INNER PRODUCT SPACES
Let H and K be indefinite inner product spaces. This paper shows that a bijective map Φ: B(H) → B(K) satisfies Φ(AB+ + B+A) = Φ(A)Φ(B)+ + Φ(B)+Φ(A) for every pair A,B ∈ B(H) if and only if either Φ(A) = cUAU+ for all A or Φ(A) = cUA+U+ for all A; Φ satisfies Φ(AB+A) = Φ(A)Φ(B)+Φ(A) for every pair A, B ∈ B(H) if and only if either Φ(A) = UAV for all A or Φ(A) = UA+V for all A, where A+ denotes the indefinite conjugate of A, U and V are bounded invertible linear or conjugate linear operators with U+U = c-1I and V+V = cI for some nonzero real number c.
作 者: 作者单位: 刊 名: 数学年刊B辑(英文版) ISTIC SCI 英文刊名: CHINESE ANNALS OF MATHEMATICS,SERIES B 年,卷(期): 2005 26(4) 分类号: O1 关键词: Indefinite inner product spaces +-Automorphisms Jordan product【CHARACTERIZATIONS OF JORDAN +-SKEW M】相关文章:
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