Slice-Polynomial Functions and Twistor Geometry of Ruled Surfaces in CP3

Abstract

In the present paper we introduce the class of slice-polynomial functions: slice regular functions defined over the quaternions, outside the real axis, whose restriction to any complex half-plane is a polynomial. These functions naturally emerge in the twistor interpretation of slice regularity introduced in gensalsto and developed in AAtwistor. To any slice-polynomial function P we associate its companion P and its extension to the real axis PR, that are quaternionic functions naturally related to P. Then, using the theory of twistor spaces, we are able to show that for any quaternion q the cardinality of simultaneous pre-images of q via P, P and PR is generically constant, giving a notion of degree. With the brand new tool of slice-polynomial functions, we compute the twistor discriminant locus of a cubic scroll C in CP3 and we conclude by giving some qualitative results on the complex structures induced by C via the twistor projection.