On the regular elements of rings in which the product of any two zero divisions lies in the galois subring

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International Journal of Pure and Applied Mathematics

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Suppose R is a completely primary finite ring in which the product of any two zero divisors lies in the Galois (coefficient) subring. We construct R and find a generalized characterization of its regular elements.

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Research on International Journal of Pure and Applied Mathematics

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Oduor, O. M., Libendi, O. A., & Christopher, M. (2013). ON THE REGULAR ELEMENTS OF RINGS IN WHICH THE PRODUCT OF ANY TWO ZERO DIVISORS LIES IN THE GALOIS SUBRING. International Journal of Pure and Applied Mathematics, 86(2), 333-344.

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