Glasnik Matematicki, Vol. 48, No. 1 (2013), 67-79.
A RESULT CONCERNING DERIVATIONS IN PRIME RINGS
Maja Fošner and Nina Peršin
Faculty of logistics,
University of Maribor,
Mariborska cesta 7, 3000 Celje,
Slovenia
e-mail: maja.fosner@uni-mb.si
Prušnikova 48, 2000 Maribor,
Slovenia
e-mail: nina-persin@t-2.net
Abstract. A classical result of Herstein asserts that any Jordan
derivation on a prime ring of characteristic different from two is a derivation.
It is our aim in this paper to prove the following result,
which is in the spirit of Herstein's theorem.
Let R be a prime ring with char(R)=0 or 4 < char(R),
and let D:R → R be an additive mapping satisfying either the
relation D(x3)=D(x2)x+x2D(x) or the relation D(x3)=D(x)x2+xD(x2) for all x R. In both cases D
is a derivation.
2010 Mathematics Subject Classification.
16W10, 46K15, 39B05.
Key words and phrases. Prime ring, semiprime ring, derivation,
Jordan derivation, Jordan triple derivation, functional identity.
Full text (PDF) (free access)
DOI: 10.3336/gm.48.1.06
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