Commutativity results for semiprime rings with derivations

Daif, Mohammad Nagy

doi:10.1155/s0161171298000660

Cited by 42 publications

(18 citation statements)

References 5 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…This result was extended for semiprime rings in [8] by Daif. Further, for semiprime rings, Andima and Pajoohesh [3] showed that an inner derivation satisfying the above mentioned condition on a nonzero ideal of must be zero on that ideal.…”

Section: Introductionmentioning

confidence: 78%

On derivations and commutativity of prime rings with involution

Ali

Dar

Asci

2015

Georgian Mathematical Journal

View full text Add to dashboard Cite

In [6], Bell and Daif proved that if is a prime ring admitting a nonzero derivation such that ( ) = ( ) for all , ∈ , then is commutative. The objective of this paper is to examine similar problems when the ring is equipped with involution. It is shown that if a prime ring with involution * of a characteristic di erent from 2 admits a nonzero derivation such that ( * ) = ( * ) for all ∈ and ( ) ∩ ( ) ̸ = (0), then is commutative. Moreover, some related results have also been discussed.

show abstract

Section: Introductionmentioning

confidence: 78%

On derivations and commutativity of prime rings with involution

Ali

Dar

Asci

2015

Georgian Mathematical Journal

View full text Add to dashboard Cite

show abstract

“…In [10] Herstein proved that if a prime ring R of characteristic different from two admits a nonzero derivation d such that [d(x), d(y)] = 0 holds for all x, y ∈ R, then R is commutative. Daif in [8] extended this result for semiprime rings.…”

Section: Lemma 1 ([1] Lemma 1) Let R Be a Ring P Be A Prime Ideal Omentioning

confidence: 75%

On derivations involving prime ideals and commutativity in rings

Mamouni¹,

Oukhtite

Mohammed

2020

São Paulo J. Math. Sci.

View full text Add to dashboard Cite

The principal aim of this paper is to study the structure of quotient rings R/P where R is an arbitrary ring and P is a prime ideal of R. Especially, we will establish a relationship between the structure of this class of rings and the behaviour of derivations satisfying algebraic identities involving prime ideals. Some well-known results characterizing commutativity of (semi)-prime rings have been generalized.

show abstract

“…In [13], Herstein proved that if R is a prime ring of characteristic not two admitting a nonzero derivation d such that [d(x), d(y)] = 0 for all x, y ∈ R, then R is commutative. Further, Daif [10] showed that a 2-torsion free semiprime ring R admits a nonzero derivation d such that [d(x), d(y)] = 0 for all x, y ∈ I, where I is a nonzero ideal of R, then R contains a nonzero central ideal. In [15], Lanski prove that if L is a noncommutative Lie ideal of a 2-torsion free prime ring R and d, h are nonzero derivations of R such that [d(x), h(x)] ∈ C for all x ∈ L, then h = λd, where λ ∈ C. Very recently, the first author together with Dar [11] proved the following result: Let R be a prime ring with involution * of the second kind such that char(R) = 2.…”

Section: Introductionmentioning

confidence: 99%

A Characterization of Derivations in Prime Rings with Involution

Ali

Mozumder²,

Abbasi³

et al. 2019

Eur. J. Pure Appl. Math.

View full text Add to dashboard Cite

The purpose of this paper is to investigate $*$-differential identities satisfied by pair of derivations on prime rings with involution. In particular, we prove that if a 2-torsion free noncommutative ring $R$ admit nonzero derivations $d_1, d_2$ such that $[d_1(x), d_2(x^*)]=0$ for all $x\in R$, then $d_1=\lambda d_2$, where $\lambda\in C$. Finally, we provide an example to show that the condition imposed in the hypothesis of our results are necessary.

show abstract

Commutativity results for semiprime rings with derivations

Cited by 42 publications

References 5 publications

On derivations and commutativity of prime rings with involution

On derivations and commutativity of prime rings with involution

On derivations involving prime ideals and commutativity in rings

A Characterization of Derivations in Prime Rings with Involution

Contact Info

Product

Resources

About