On the Jacobson radical of skew polynomial extensions of rings satisfying a polynomial identity
Abstract
Let R be a ring satisfying a polynomial identity and let D be a derivation of R. We consider the Jacobson radical of the skew polynomial ring R[x;D] with coefficients in R and with respect to D, and show that J(R[x;D]) R is a nil D-ideal. This extends a result of Ferrero, Kishimoto, and Motose, who proved this in the case when R is commutative.
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