Finite completely primary rings in which the product of any two zero divisors of a ring is in its coefficient subring

Finite completely primary rings in which the product of any two zero divisors of a ring is in its coefficient subring

According to general terminology, a ring R is completely primary if its set of zero divisors J forms an ideal. Let R be a finite completely primary ring. It is easy to establish that J is the unique maximal ideal of R and R has a coefficient subring S (i.e. R/J isomorphic to S/pS) which is a Galois...

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Bibliographic Details
Main Author:	Yousif Alkhamees
Format:	Article
Language:	English
Published:	Wiley 1994-01-01
Series:	International Journal of Mathematics and Mathematical Sciences
Subjects:	finite completely primary ring Galois ring.
Online Access:	http://dx.doi.org/10.1155/S0161171294000670
Tags:	Add Tag No Tags, Be the first to tag this record!

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