Let B(H) be the C^*-algebra of all bounded linear operators on a complex Hilbert space H. It is proved that an additive surjective map φ on B(H) preserving the star partial order in both directions if and only i...Let B(H) be the C^*-algebra of all bounded linear operators on a complex Hilbert space H. It is proved that an additive surjective map φ on B(H) preserving the star partial order in both directions if and only if one of the following assertions holds. (1) There exist a nonzero complex number a and two unitary operators U and V on H such that φ(X) = a UXV or φ(X) = α UX^* V for all X ∈B(H). (2) There exist a nonzero a and two anti-unitary operators U and V on H such that φ(X) = αUXV or φ(X) = aUX^* Vfor all X∈ B(H).展开更多
基金The NSF(11371233)of Chinathe Fundamental Research Funds(GK201301007)for the Central Universities
文摘Let B(H) be the C^*-algebra of all bounded linear operators on a complex Hilbert space H. It is proved that an additive surjective map φ on B(H) preserving the star partial order in both directions if and only if one of the following assertions holds. (1) There exist a nonzero complex number a and two unitary operators U and V on H such that φ(X) = a UXV or φ(X) = α UX^* V for all X ∈B(H). (2) There exist a nonzero a and two anti-unitary operators U and V on H such that φ(X) = αUXV or φ(X) = aUX^* Vfor all X∈ B(H).
