Self-Dual Fields and Quaternion Analyticity
Abstract
Quaternionic formulation of D=4 conformal group and of its associated twistors and their relation to harmonic analyticity is presented. Generalization of SL(2,C) to the D=4 conformal group SO(5,1) and its covering group SL(2,Q) that generalizes the euclidean Lorentz group in R4 [namely SO(3,1)≈ SL(2,C) which allow us to obtain the projective twistor space CP3] is shown. Quasi-conformal fields are introduced in D=4 and Fueter mappings are shown to map self-dual sector onto itself (and similarly for the anti-self-dual part). Differentiation of Fueter series and various forms of differential operators are shown, establishing the equivalence of Fueter analyticity with twistor and harmonic analyticity. A brief discussion of possible octonion analyticity is provided.
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