Jordan triple derivation on alternative rings.
Keywords:
Alternative ring, Idempotent element, Maps, AdditivityAbstract
Let D be a mapping from an alternative ring R into itself satisfying D(a · ba) = D(a) · ba+ a · D(b)a +a · bD(a) for all a, b ∈ R. Under some conditions on R, we show that D is additive.
References
B. L. M. Ferreira and J. C. M. Ferreira, Additivity of n-Multiplicative Maps on Alternative Rings, Communications In Algebra 44, pp. 1557-1568, (2016).
B. L. M. Ferreira, J. C. M. Ferreira and H. Guzzo Jr., Jordan Maps on Alternative Algebras, JP Journal of Algebra, Number Theory and Applications 31, pp. 129-142, (2013).
B. L. M. Ferreira, J. C. M. Ferreira and H. Guzzo Jr., Jordan Triple Elementary Maps on Alternative Rings, Extracta Mathematicae 29,pp. 1-18, (2014).
B. L. M. Ferreira, J. C. M. Ferreira and H. Guzzo Jr., Jordan Triple Maps of Alternative Algebras, JP Journal of Algebra, Number Theory and Applications 33, pp. 25-33, (2014).
B. L. M. Ferreira and R. Nascimento, Derivable Maps on Alternative Rings, Recen 16, pp. 9-15, (2014).
R. N. Ferreira and B. L. M. Ferreira, Jordan Derivation on Alternative Rings, International Journal of Mathematics, Game Theory and Algebra 25, pp. 435-445, (2017).
M. Slater, Prime Alternative Rings, I, Journal of Algebra 15, pp. 229-243, (1970).
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