Skew polynomial rings which are generalized Asano prime rings. (Q2853960)

Let \(R\) be a prime Goldie ring with quotient ring \(Q\), and let \(\sigma\) be an automorphism of \(R\). Assume that \(R\) is \(\tau\)-Noetherian with respect to the Lambek torsion theory \(\tau\). The authors call \(R\) a \(\sigma\)-Krull prime ring if the left and right multiplier of any \(\sigma\)-invariant \(R\)-ideal is equal to \(R\). If, in addition, the \(\sigma\)-invariant \(v\)-ideals are invertible, they call \(R\) a \(\sigma\)-generalized Asano prime ring. For a \(\sigma\)-Krull prime ring \(R\), the \(v\)-ideals of the skew polynomial ring \(R[x;\sigma]\) are determined. As a consequence, it is shown that \(R\) is a \(\sigma\)-generalized Asano prime ring if and only if \(R[x;\sigma]\) is a generalized Asano prime ring.