Skew commutators in simple rings

In this paper we study skew elements R k and their commutators in a real factor R, and prove that if R and S are real factors not of type I 1 and I 2 then derived Lie algebras [R k , R k ] and [S k , S k ] are isomorphic if and only if R and S are \*-isomorphic.

Many rings that have enjoyed growing interest in recent years, e.g., quantum enveloping algebras, quantum matrices, certain Witten-algebras, . . . , can be presented as generalized Weyl algebras. In the paper we develop techniques for calculating dimensions, here mainly the Krull dimension in the se

Efficient algorithms are presented for factoring polynomials in the skew-polynomial ring F[x; σ], a non-commutative generalization of the usual ring of polynomials F[x], where F is a finite field and σ: F → F is an automorphism (iterated Frobenius map). Applications include fast functional decomposi