Abstract
Let R be a right Ore domain and φ a derivation or an automorphism of R. We determine the right Martindale quotient ring of the Ore extension R[t; φ] (Theorem 1.1). As an attempt to generalize both the Weyl algebra and the quantum plane, we apply this to rings R such that k[x] ⊆ R ⊆ k(x), where k is a field and x is a commuting variable. The Martindale Quotient quotient ring of R[t; φ] and its automorphisms are computed. In this way, we obtain a family of non-isomorphic infinite dimensional simple domains with all their automorphisms explicitly described.
ACKNOWLEDGEMENT
The author thanks the referee for suggesting the consideration of isomorphisms instead of automorphisms in §3, which is more general, natural, and interesting.
Notes
Communicated by E. Kirkman.