Title of article :
Strong Bi-skew Commutativity Preserving Maps on von Neumann Algebras
Author/Authors :
Qi ، Xiaofei Department of Mathematics - School of Mathematical Science - Shanxi University , Chen ، Shaobo Department of Mathematics - School of Mathematical Science - Shanxi University
Abstract :
Let M be a von Neumann algebra with no central summands of type I1. Assume that : M → M is a surjective map and (I ) is an unitary operator. It is shown that is strong bi-skew commutativity preserving (that is, satisfies (A) (B)^∗− (B) (A) ∗ = AB^∗−BA∗ for all A, B ∈M) if and only if there exists a self-adjoint central operator Z ∈Mwith Z2 = I such that (A) = Z A (I ) for all A ∈M. The strong bi-skew commutativity preserving maps on prime algebras with involution are also characterized.
Keywords :
Skew Lie products , Bi , skew Lie products , Strong bi , skew commutativity preserving maps , von Neumann algebras , Prime algebras ,
Journal title :
Bulletin of the Iranian Mathematical Society
Journal title :
Bulletin of the Iranian Mathematical Society
