Jordan higher all-derivable points in triangular algebras

Abstract

Let T be a triangular algebra. We say that D=\Dn: n∈ N\⊂eq L(T) is a Jordan higher derivable mapping at G if Dn(ST+TS)=Σi+j=n(Di(S)Dj(T)+Di(T)Dj(S)) for any S,T∈ T with ST=G. An element G∈ T is called a Jordan higher all-derivable point of T if every Jordan higher derivable linear mapping D=\Dn\n∈ N at G is a higher derivation. In this paper, under some mild conditions on T, we prove that some elements of T are Jordan higher all-derivable points. This extends some results in [6] to the case of Jordan higher derivations.