On (m,n,l)-Jordan Centralizers of Some Algebras

Abstract

Let A be a unital algebra over the complex field C. A linear mapping δ from A into itself is called a weak (m,n,l)-Jordan centralizer if (m+n+l)δ(A2)-mδ(A)A-nAδ(A)-lAδ(I)A∈ CI for every A∈ A, where m≥0, n≥0, l≥0 are fixed integers with m+n+l≠ 0. In this paper, we study weak (m,n,l)-Jordan centralizer on generalized matrix algebras and some reflexive algebras algL, where L is CSL or satisfies \L: L∈ J(L)\=X or \L-: L∈ J(L)\=(0), and prove that each weak (m,n,l)-Jordan centralizer of these algebras is a centralizer when m+l≥1 and n+l≥1.