Abstract
AbstractIf $T$ is any finite higher commutator in an associative ring $R$, for example, $T= [[R, R] , [R, R] ] $, and if $T$ has minimal cardinality so that the ideal generated by $T$ is infinite, then $T$ is in the centre of $R$ and ${T}^{2} = 0$. Also, if $T$ is any finite, higher commutator containing no nonzero nilpotent element then $T$ generates a finite ideal.
Publisher
Cambridge University Press (CUP)
Reference11 articles.
1. On ?properties of rings with a finite number of zero divisors?
2. Rings with few nilpotents;Lanski;Houston J. Math.,1992
3. On the cardinality of rings with special subsets which are finite;Lanski;Houston J. Math.,1993
4. COMBINATORIAL COMMUTATIVITY AND FINITENESS CONDITIONS FOR RINGS
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