Atiyah sequences of braided Lie algebras and their splittings
Abstract
Associated with an equivariant noncommutative principal bundle we give an Atiyah sequence of braided derivations whose splittings give connections on the bundle. Vertical braided derivations act as infinitesimal gauge transformations on connections. For the SU(2)-principal bundle over the sphere S4θ an equivariant splitting of the Atiyah sequence recovers the instanton connection. An infinitesimal action of the braided conformal Lie algebra soθ(5,1) yields a five parameter family of splittings. On the principal SOθ(2n,R)-bundle of orthonormal frames over the sphere S2nθ, the splitting of the sequence leads to the Levi-Civita connection for the `round' metric on the S2nθ. The corresponding Riemannian geometry of S2nθ is worked out.
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