Strong commutativity preserving generalized derivations on Lie ideals |
| |
| Authors: | Cheng-Kai Liu |
| |
| Affiliation: | Department of Mathematics , National Changhua University of Education , Changhua 500, Taiwan |
| |
| Abstract: | ![]()
We apply elementary matrix computations and the theory of differential identities to prove the following: let R be a prime ring with extended centroid C and L a noncommutative Lie ideal of R. Suppose that f?:?L?→?R is a map and g is a generalized derivation of R such that [f(x),?g(y)]?=?[x,?y] for all x,?y?∈?L. Then there exist a nonzero α?∈?C and a map μ?:?L?→?C such that g(x)?=?αx for all x?∈?R and f(x)?=?α?1 x?+?μ(x) for all x?∈?L, except when R???M 2(F), the 2?×?2 matrix ring over a field F. |
| |
| Keywords: | prime ring generalized derivation strong commutativity preserving |
|
|
