Characterization of ($α$,$α$)-derivation on $B(X)$

Abstract

Let $X$ be a Banach algebra and $B(X)$ be the set of all bounded linear operators on $X$. Suppose that $α: B(X) \rightarrow B(X)$ is an automorphism. We say that a mapping $δ$ from $B(X)$ into itself is derivable at $G \in B(X)$ if $δ(G) = α(A)δ(B) + δ(A)α(B)$ for all $A, B \in B(X)$ with $AB = G$. We say that an element $G \in B(X)$ is an $(α,α)$-all derivable point of $B(X)$ if every $(α,α)$-derivable mapping $δ$ at G is an $(α,α)$-derivation. In this paper, we show that every $(α,α)$-derivable mapping at a nonzero element in $B(X)$ is an $(α,α)$-derivation.