Reverse Derivations With Invertible Values | ||
Iraqi Journal of Science | ||
Article 1, Volume 55, Issue 4, October 2014, Pages 1953-1961 | ||
Authors | ||
A. H. Majeed; Shahed .A. Hamil | ||
Abstract | ||
In this paper, we will prove the following theorem, Let R be a ring with 1 having a reverse derivation d ≠ 0 such that, for each x R, either d(x) = 0 or d(x) is invertible in R, then R must be one of the following: (i) a division ring D, (ii) D , the ring of 2×2 matrices over D, (iii) D[x]/(x where char D = 2, d (D) = 0 and d(x) = 1 + ax for some a in the center Z of D. Furthermore, if 2R ≠ 0 then R = D is possible if and only if D does not contain all quadratic extensions of Z, the center of D. | ||
Keywords | ||
derivation; reverse derivation | ||
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