摘要
Let A be a factor von Neumann algebra and Ф be a nonlinear surjective map from A onto itself. We prove that, if Ф satisfies that Ф(A)Ф(B) - Ф(B)Ф(A)* -- AB - BA* for all A, B ∈ A, then there exist a linear bijective map ψA →A satisfying ψ(A)ψ(B) - ψ(B)ψ(A)* = AB - BA* for A, B ∈ A and a real functional h on A with h(0) -= 0 such that Ф(A) = ψ(A) + h(A)I for every A ∈ A. In particular, if .4 is a type I factor, then, Ф(A) = cA + h(A)I for every A ∈ .4, where c = ±1.
Let A be a factor von Neumann algebra and Ф be a nonlinear surjective map from A onto itself. We prove that, if Ф satisfies that Ф(A)Ф(B) - Ф(B)Ф(A)* -- AB - BA* for all A, B ∈ A, then there exist a linear bijective map ψA →A satisfying ψ(A)ψ(B) - ψ(B)ψ(A)* = AB - BA* for A, B ∈ A and a real functional h on A with h(0) -= 0 such that Ф(A) = ψ(A) + h(A)I for every A ∈ A. In particular, if .4 is a type I factor, then, Ф(A) = cA + h(A)I for every A ∈ .4, where c = ±1.
基金
supported by National Natural Science Foundation of China(10871111)
the Specialized Research Fund for Doctoral Program of Higher Education(200800030059)(to Cui)
Basic Science Research Program through the National Research Foundation of Korea funded by the Ministry of Education,Science and Technology(NRF-2009-0070788)(to Park)