• THE MIDDLE NUCLEUS EQUALS THE CENTER IN PRIME JORDAN RINGS
Abstract
In this paper we show that in a Jordan ring R, for fixed n in the middle nucleus Nm, the additive subgroup B generated by all elements of the form (n,R,R) is an ideal of R. Then it is proved that R is either associative or the middle nucleus equals the center.
Keywords
Nucleus, Center, Jordan ring, Divisible ring.
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