Linear maps which are anti-derivable at zero
Operator Algebras
2020-03-05 v3 Functional Analysis
Abstract
Let be a bounded linear operator, where is a C-algebra, and denotes an essential Banach -bimodule. We prove that the following statements are equivalent: is anti-derivable at zero (i.e. in implies ); There exist an anti-derivation and an element satisfying and for all . We also prove a similar equivalence when is replaced with . This provides a complete characterization of those bounded linear maps from into or into which are anti-derivable at zero. We also present a complete characterization of those continuous linear operators which are -anti-derivable at zero.
Keywords
Cite
@article{arxiv.1911.04134,
title = {Linear maps which are anti-derivable at zero},
author = {Doha Adel Abulhamil and Fatmah B. Jamjoom and Antonio M. Peralta},
journal= {arXiv preprint arXiv:1911.04134},
year = {2020}
}