Jordan and Jordan Higher All-derivable Points of Some Algebras

Abstract

In this paper, we characterize Jordan derivable mappings in terms of Peirce decomposition and determine Jordan all-derivable points for some general bimodules. Then we generalize the results to the case of Jordan higher derivable mappings. An immediate application of our main results shows that for a nest N on a Banach X with the associated nest algebra algN, if there exists a non-trivial element in N which is complemented in X, then every C∈ algN is a Jordan all-derivable point of L(algN, B(X)) and a Jordan higher all-derivable point of L(algN).