Multiplicative generalized derivations on ideals in semiprime rings
Ö Gölbaşi - Mathematica Slovaca, 2016 - degruyter.com
Let R be a ring and I is a nonzero ideal of R. A mapping F: R→ R is called a multiplicative
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
MULTIPLICATIVE GENERALIZED DERIVATIONS ON IDEALS IN SEMIPRIME RINGS.
Ö GÖLBAşI - Mathematica Slovaca, 2016 - search.ebscohost.com
Let R be a ring and I is a nonzero ideal of R. A mapping F: R→ R is called a multiplicative
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
MULTIPLICATIVE GENERALIZED DERIVATIONS ON IDEALS IN SEMIPRIME RINGS
Ö Golbas - MATHEMATICA SLOVACA, 2016 - avesis.cumhuriyet.edu.tr
Let R be a ring and I is a nonzero ideal of R. A mapping F: R-> R is called a multiplicative
generalized derivation if there exists a mapping g: R-> R such that F (xy)= F (x) y+ xg (y), for …
generalized derivation if there exists a mapping g: R-> R such that F (xy)= F (x) y+ xg (y), for …
MULTIPLICATIVE GENERALIZED DERIVATIONS ON IDEALS IN SEMIPRIME RINGS
O Gölbasi - Math. Slovaca, 2016 - degruyter.com
Let R be a ring and I is a nonzero ideal of R. A mapping F: R→ R is called a multiplicative
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
generalized derivation if there exists a mapping g: R→ R such that F (xy)= F (x) y+ xg (y), for …
Multiplicative generalized derivations on ideals in semiprime rings
Ö Gölbasi - Mathematica Slovaca, 2016 - search.proquest.com
Let [R] be a ring and [I] is a nonzero ideal of [R]. A mapping [F]:[R][arrow right][R] is called a
multiplicative generalized derivation if there exists a mapping [g]:[R][arrow right][R] such that …
multiplicative generalized derivation if there exists a mapping [g]:[R][arrow right][R] such that …