Action of higher derivations on semiprime rings

Shakir Ali; Vaishali Varshney

doi:10.1515/gmj-2024-2026

Artikel

Action of higher derivations on semiprime rings

Shakir Ali und Vaishali Varshney

Veröffentlicht/Copyright: 26. Juni 2024

Veröffentlicht von

Veröffentlichen auch Sie bei De Gruyter Brill

Informationen für Autor*innen Erkunden Sie dieses Fachgebiet

Aus der Zeitschrift Georgian Mathematical Journal Band 32 Heft 1

Abstract

Let m , n be the fixed positive integers and let ℛ be a ring. In 1978, Herstein proved that a 2-torsion free prime ring ℛ is commutative if there is a nonzero derivation d of R such that [ d ⁢ ( ϱ ) , d ⁢ ( ξ ) ] = 0 for all ϱ , ξ ∈ R . In this article, we study the above mentioned classical result for higher derivations and describe the structure of semiprime rings by using the invariance property of prime ideals under higher derivations. Precisely, apart from proving some other important results, we prove the following. Let ( d i ) i ∈ ℕ and ( g j ) j ∈ ℕ be two higher derivations of semiprime ring ℛ such that [ d n ⁢ ( ϱ ) , g m ⁢ ( ξ ) ] ∈ Z ⁢ ( ℛ ) for all ϱ , ξ ∈ ℐ , where ℐ is an ideal of ℛ . Then either ℛ is commutative or some linear combination of ( d i ) i ∈ ℕ sends Z ⁢ ( ℛ ) to zero or some linear combination of ( g j ) j ∈ ℕ sends Z ⁢ ( ℛ ) to zero. We enrich our results with examples that show the necessity of their assumptions. Finally, we conclude our paper with a direction for further research.

Keywords: Semiprime ring; Martindale ring of quotient; extended centroid; prime ideal; derivation; higher derivation

MSC 2020: 16W25; 16N60; 16R60

Acknowledgements

The authors would like to thank the anonymous reviewer for his/her valuable suggestions and comments, which helps us to improve the presentation of manuscript.

References

[1] S. Ali, T. Alsuraiheed, C. Abdioglu, M. S. Khan and V. Varshney, Invariance of minimal prime ideals under higher derivations with applications, Ric. Mat., to appear. Suche in Google Scholar

[2] S. Ali, T. M. Alsuraiheed, N. Parveen and V. Varshney, Action of n-derivations and n-multipliers on ideals of (semi-)prime rings, AIMS Math. 8 (2023), no. 7, 17208–17228. 10.3934/math.2023879Suche in Google Scholar

[3] S. Ali and H. Shuliang, On derivations in semiprime rings, Algebr. Represent. Theory 15 (2012), no. 6, 1023–1033. 10.1007/s10468-011-9271-9Suche in Google Scholar

[4] S. Andima and H. Pajoohesh, Commutativity of rings with derivations, Acta Math. Hungar. 128 (2010), no. 1–2, 1–14. 10.1007/s10474-010-9092-zSuche in Google Scholar

[5] N. Argaç, On prime and semiprime rings with derivations, Algebra Colloq. 13 (2006), no. 3, 371–380. 10.1142/S1005386706000320Suche in Google Scholar

[6] M. Ashraf and N.-u. Rehman, On commutativity of rings with derivations, Results Math. 42 (2002), no. 1–2, 3–8. 10.1007/BF03323547Suche in Google Scholar

[7] K. I. Beidar, W. S. Martindale, III and A. V. Mikhalev, Rings with Generalized Identities, Monogr. Textb. Pure Appl. Math. 196, Marcel Dekker, New York, 1996. Suche in Google Scholar

[8] H. E. Bell and M. N. Daif, On commutativity and strong commutativity-preserving maps, Canad. Math. Bull. 37 (1994), no. 4, 443–447. 10.4153/CMB-1994-064-xSuche in Google Scholar

[9] H. E. Bell and N.-U. Rehman, Generalized derivations with commutativity and anti-commutativity conditions, Math. J. Okayama Univ. 49 (2007), 139–147. Suche in Google Scholar

[10] M. Brešar, Centralizing mappings and derivations in prime rings, J. Algebra 156 (1993), no. 2, 385–394. 10.1006/jabr.1993.1080Suche in Google Scholar

[11] M. Brešar, On skew-commuting mappings of rings, Bull. Aust. Math. Soc. 47 (1993), no. 2, 291–296. 10.1017/S0004972700012521Suche in Google Scholar

[12] C.-L. Chuang, GPIs having coefficients in Utumi quotient rings, Proc. Amer. Math. Soc. 103 (1988), no. 3, 723–728. 10.1090/S0002-9939-1988-0947646-4Suche in Google Scholar

[13] W. Cortes and C. Haetinger, On Jordan generalized higher derivations in rings, Turkish J. Math. 29 (2005), no. 1, 1–10. Suche in Google Scholar

[14] M. N. Daif, Commutativity results for semiprime rings with derivations, Int. J. Math. Math. Sci. 21 (1998), no. 3, 471–474. 10.1155/S0161171298000660Suche in Google Scholar

[15] M. N. Daif and H. E. Bell, Remarks on derivations on semiprime rings, Int. J. Math. Math. Sci. 15 (1992), no. 1, 205–206. 10.1155/S0161171292000255Suche in Google Scholar

[16] V. De Filippis, On derivations and commutativity in prime rings, Int. J. Math. Math. Sci. (2004), no. 69–72, 3859–3865. 10.1155/S0161171204403536Suche in Google Scholar

[17] M. Ferrero and C. Haetinger, Higher derivations of semiprime rings, Comm. Algebra 30 (2002), no. 5, 2321–2333. 10.1081/AGB-120003471Suche in Google Scholar

[18] A. Fošner and J. Vukman, Some results concerning additive mappings and derivations on semiprime rings, Publ. Math. Debrecen 78 (2011), no. 3–4, 575–581. 10.5486/PMD.2011.4792Suche in Google Scholar

[19] V. K. Harčenko, Differential identities of prime rings, Algebra Logic 17 (1978), no. 2, 155–168. 10.1007/BF01670115Suche in Google Scholar

[20] I. N. Herstein, Topics in Ring Theory, University of Chicago, Chicago, 1969. Suche in Google Scholar

[21] I. N. Herstein, A note on derivations, Canad. Math. Bull. 21 (1978), no. 3, 369–370. 10.4153/CMB-1978-065-xSuche in Google Scholar

[22] M. Hongan, A note on semiprime rings with derivation, Int. J. Math. Math. Sci. 20 (1997), no. 2, 413–415. 10.1155/S0161171297000562Suche in Google Scholar

[23] N. Jacobson, Basic Algebra. II, 2nd ed., W. H. Freeman, New York, 1989. Suche in Google Scholar

[24] C. Lanski, An Engel condition with derivation for left ideals, Proc. Amer. Math. Soc. 125 (1997), no. 2, 339–345. 10.1090/S0002-9939-97-03673-3Suche in Google Scholar

[25] A. Mamouni, L. Oukhtite and M. Zerra, On derivations involving prime ideals and commutativity in rings, São Paulo J. Math. Sci. 14 (2020), no. 2, 675–688. 10.1007/s40863-020-00187-zSuche in Google Scholar

[26] W. S. Martindale, III, Lie isomorphisms of prime rings, Trans. Amer. Math. Soc. 142 (1969), 437–455. 10.1090/S0002-9947-1969-0251077-5Suche in Google Scholar

[27] J. H. Mayne, Centralizing automorphisms of Lie ideals in prime rings, Canad. Math. Bull. 35 (1992), no. 4, 510–514. 10.4153/CMB-1992-067-0Suche in Google Scholar

[28] B. Prajapati, Higher derivations and Posner’s second theorem for semiprime rings, Ann. Univ. Ferrara Sez. VII Sci. Mat. 67 (2021), no. 1, 175–181. 10.1007/s11565-020-00352-4Suche in Google Scholar

[29] N.-U. Rehman, On commutativity of rings with generalized derivations, Math. J. Okayama Univ. 44 (2002), 43–49. Suche in Google Scholar

[30] F. K. Schmidt and H. Hasse, Noch eine Begründung der Theorie der höheren Differentialquotienten in einem algebraischen Funktionenkörper einer Unbestimmten. (Nach einer brieflichen Mitteilung von F. K. Schmidt in Jena), J. Reine Angew. Math. 177 (1937), 215–237. 10.1515/crll.1937.177.215Suche in Google Scholar

Received: 2023-10-07

Revised: 2024-01-03

Accepted: 2024-02-02

Published Online: 2024-06-26

Published in Print: 2025-02-01

Sie haben derzeit keinen Zugang zu diesem Inhalt.

Artikel in diesem Heft

https://doi.org/10.1515/gmj-2024-2026

Schlagwörter für diesen Artikel

Semiprime ring; Martindale ring of quotient; extended centroid; prime ideal; derivation; higher derivation