Additive maps on some operator algebras behaving like (α,β)-derivations or generalized (α,β)-derivations at zero-product elements

Let A be a subalgebra of B(X) containing the identity operator I and an idempotent P. Suppose that α,β:A→A are ring epimorphisms and there exists some nest N on X such that α (P)(X) and β(P)(X) are non-trivial elements of N. Let A contain all rank one operators in AlgN and δ : A→B(X) be an additive...

Full description

Saved in:
Bibliographic Details
Published in:Acta mathematica scientia 2014-07, Vol.34 (4), p.1287-1300
Main Author: GHAHRAMANI, Hoger
Format: Article
Language:English
Subjects:
(α,β)-derivation
47B49
47L35
Additives
Algebra
generalized (α,β)-derivation
Mapping
nest algebra
Neural networks
operator algebra
Operators
Citations: Items that this one cites
Items that cite this one
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:Let A be a subalgebra of B(X) containing the identity operator I and an idempotent P. Suppose that α,β:A→A are ring epimorphisms and there exists some nest N on X such that α (P)(X) and β(P)(X) are non-trivial elements of N. Let A contain all rank one operators in AlgN and δ : A→B(X) be an additive mapping. It is shown that, if δ is (α,β)-derivable at zero point, then there exists an additive (α,β)=derivation τ : A→B(X) such that δ(A)=τ(A)+α(A)δ(I) for all A∈ A. It is also shown that if δ is generalized (α,β)-derivable at zero point, then δ is an additive generalized (α,β)-derivation. Moreover, by use of this result, the additive maps (generalized) (α,β)-derivable at zero point on several nest algebras, are also characterized.
ISSN:0252-9602
1572-9087
DOI:10.1016/S0252-9602(14)60085-0