Geometry of the slice regular M\"obius transformations of the quaternionic unit ball
Abstract
For the quaternionic unit ball B, let us denote by M(B) the set of slice regular M\"obius transformations mapping B onto itself. We introduce a smooth manifold structure on M(B), for which the evaluation(-action) map of M(B) on B is smooth. The manifold structure considered on M(B) is obtained by realizing this set as a quotient of the Lie group Sp(1,1), Furthermore, it turns out that B is a quotient as well of both M(B) and Sp(1,1). These quotients are in the sense of principal fiber bundles. The manifold M(B) is diffeomorphic to R4 × S3.
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