SOME PROPERTIES OF SYMMETRIC BI-(σ, Τ)-DERIVATIONS IN NEAR-RINGS

Title & Authors
SOME PROPERTIES OF SYMMETRIC BI-(σ, Τ)-DERIVATIONS IN NEAR-RINGS
Ceven, Yilmaz; Ozturk, Mehmet Ali;

Abstract
In this paper, we introduce a symmetric $\small{bi-({\sigma},\;{\tau})-derivation}$ in a near-ring and generalize some of the results in [5, 6, 8, 9].
Keywords
prime near-ring;$\small{bi-({\sigma},\;{\tau})-derivation}$;Symmetric bi-derivation;
Language
English
Cited by
1.
ON SYMMETRIC GENERALIZED 3-DERIVATIONS AND COMMUTATIVITY IN PRIME NEAR-RINGS,;;

호남수학학술지, 2009. vol.31. 2, pp.203-217
2.
ON PERMUTING 3-DERIVATIONS AND COMMUTATIVITY IN PRIME NEAR-RINGS,;;

대한수학회논문집, 2010. vol.25. 1, pp.1-9
1.
What can be expected from a cubic derivation on finite dimensional algebras?, Arabian Journal of Mathematics, 2017
2.
Posner's second theorem with two variable σ -derivations, Journal of Taibah University for Science, 2017, 11, 2, 332
3.
ON (σ, τ)-n-DERIVATIONS IN NEAR-RINGS, Asian-European Journal of Mathematics, 2013, 06, 04, 1350051
4.
ON PERMUTING 3-DERIVATIONS AND COMMUTATIVITY IN PRIME NEAR-RINGS, Communications of the Korean Mathematical Society, 2010, 25, 1, 1
5.
ON SYMMETRIC GENERALIZED 3-DERIVATIONS AND COMMUTATIVITY IN PRIME NEAR-RINGS, Honam Mathematical Journal, 2009, 31, 2, 203
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