Classifying Slice-Regular Polynomials via Group Actions on the Twistor Space
Abstract
We study the equivalence classes of slice-regular functions f:Ω on a symmetric slice domain Ω, and of their subclass made of polynomial slice-regular functions, with respect to the natural action of PGL(2,H) and its subgroups, by employing the twistor construction. In particular, we characterize slice--regular functions whose twistor lift is planar and belongs to a given orbit, and we find normal classes of slice-regular polynomials with respect to the action of a parabolic subgroup of GL(2,H).
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