References
- Akemann C, Pedersen G, Tomiyama J. Multipliers of C∗-algebras. J Funct Anal. 1973;13:277–301.
- Ara P, Mathieu M. Local multipliers of -algebras. London: Springer-Verlag; 2003.
- Johnson BE. An introduction to the theory of centralizers. Proc London Math Soc. 1964;14:299–320.
- Li P, Han D, Tang W. Centralizers and Jordan derivations for CSL subalgebras of von Neumann algebras. J Oper Theory. 2013;69:117–133.
- Kosi-Ulbl I, Vukman J. On centralizers of standard operator algebras and semisimple H∗-algebras. Acta Math Hungar. 2006;110:217–223.
- Vukman J. Centralizers of semiprime rings. Comment Math Univ Carolinae. 2001;42:237–245.
- Vukman J, Kosi-Ulbl I. On centralizers of semiprime rings with involution. Studia Sci Math Hungar. 2006;43:61–67.
- Zalar B. On centralizers of semiprime rings. Comment Math Univ Carolinae. 1991;32:609–614.
- Fošner A, Jing W. Lie centralizers on triangular rings and nest algebras. Adv Oper Theory. 2019;4:342–350.
- Jabeen A. Lie (Jordan) centralizers on generalized matrix algebras. Commun Algebra. 2021;49:278–291.
- Liu L. On nonlinear Lie centralizers of generalized matrix algebras. Linear Multilinear Algebra. 2020. doi:10.1080/03081087.2020.1810605
- Brešar M. Centralizing mappings and derivations in prime rings. J Algebra. 1993;156:385–394.
- Qi X, Hou J. Characterizing centralizers and generalized derivations on triangular algebras by acting on zero product. Acta Math Sinica (Engl Ser). 2013;29:1245–1256.
- Liu L. Characterization of centralizers on nest subalgebras of von Neumann algebras by local action. Linear Multilinear Algebra. 2016;64:383–392.
- Ghahramani H, Jing W. Lie centralizers at zero products on a class of operator algebras. Ann Funct Anal. 2021;34:1–12.
- Cheng WS. Commuting maps of triangular algebras. J Lond Math Soc. 2001;63:117–127.
- Benkovič D. Lie triple derivations of unital algebras with idempotents. Linear Multilinear Algebra. 2015;63:141–165.
- Davidson K. Nest algebras. Harlow: Longmans; 1988. (Pitman research notes in mathematics series; 191).