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Near-rings whose laminated near-rings are Boolean

Near-rings whose laminated near-rings are Boolean
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Matrix Near-rings over Centralizer Near-rings

Algebra Colloquium, 2000
In the most widely accepted definition of matrix near-rings [\textit{J. D. P. Meldrum} and \textit{A. P. J. van der Walt}, Arch. Math. 47, 312-319 (1986; Zbl 0611.16025)], there are two obvious ways of linking ideals in the base near-ring to ideals in the matrix near-ring.
Smith, Kirby C., van Wyk, Leon
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Special radicals of near-rings and Γ-near-rings

Periodica Mathematica Hungarica, 1994
All near-rings are 0-symmetric and right distributive. A \(\Gamma\)-near- ring \((M, +, \Gamma)\) is a set \(M\) and a set of binary operators \(\Gamma\) on \(M\) such that \((M, +, \gamma)\) is a near-ring for each \(\gamma \in \Gamma\), and a generalized associative law holds.
Booth, G. L., Veldsman, S.
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On Regularities in Near-Rings

Acta Mathematica Hungarica, 1997
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Groenewald, N. J., Olivier, W. A.
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