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Communications in Algebra Volume 47, 2019 - Issue 4
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Original Articles

Third power associative, antiflexible rings satisfying (a, b, bc) = b(a, b, c)

Dhabalendu SamantaDepartment of Applied Sciences and Humanities, PDM College of Engineering, Bhadurgarh, Haryana, India; Correspondence[email protected]
&
Irvin Roy HentzelDepartment of Mathematics, Iowa State University, Ames, Iowa, USA
Pages 1401-1407 | Received 11 Jun 2018, Accepted 18 Jul 2018, Published online: 18 Jan 2019

References

  • Anderson, C. T., Outcalt, D. L. (1968). On simple antiflexible rings. J. Algebra 10(3):310–320.
  • Celik, H. A. (1972). On primitive and prime antiflexible rings. J. Algebra 20:428–440.
  • Samanta, D., Hentzel, I. R. (2018). Third power associative, antiflexible rings satisfying (a,b,ac)=a(a,b,c). Comm. Algebra 46(6):2582–2588.
  • Kosier, F. (1962). On a class of nonflexible algebras. Trans. Am. Math. Soc. 102(2):299–318.
  • Rodabaugh, D. (1965). A generalization of the flexible law. Trans. Am. Math. Soc. 114(2):468–487.

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