Linear maps which are anti-derivable at zero

TL;DR

This paper characterizes bounded linear maps from a C*-algebra to a Banach bimodule that are anti-derivable at zero, providing necessary and sufficient conditions involving anti-derivations and elements in the bidual.

Contribution

It offers a complete characterization of anti-derivable-at-zero linear maps on C*-algebras, including the case of *-anti-derivable maps, extending previous understanding.

Findings

Equivalence between anti-derivability at zero and specific algebraic decompositions.

Existence of an anti-derivation and an element in the bidual satisfying certain relations.

Complete characterization of *-anti-derivable at zero operators.

Abstract

Let $T:A\to X$ be a bounded linear operator, where $A$ is a C$^*$-algebra, and $X$ denotes an essential Banach $A$-bimodule. We prove that the following statements are equivalent: $(a)$ $T$ is anti-derivable at zero (i.e. $ab =0$ in $A$ implies $T(b) a + b T(a)=0$); $(b)$ There exist an anti-derivation $d:A\to X^{**}$ and an element $\xi \in X^{**}$ satisfying $\xi a = a \xi,$ $\xi [a,b]=0,$ $T(a b) = b T(a) + T(b) a - b \xi a,$ and $T(a) = d(a) + \xi a,$ for all $a,b\in A$. We also prove a similar equivalence when $X$ is replaced with $A^{**}$. This provides a complete characterization of those bounded linear maps from $A$ into $X$ or into $A^{**}$ which are anti-derivable at zero. We also present a complete characterization of those continuous linear operators which are $^*$-anti-derivable at zero.