Holonomy displacements in Hopf bundles over complex hyperbolic space and the complex Heisenberg groups
Abstract
For the ``Hopf bundle'' S1 S2n,1 Hn, horizontal lifts of simple closed curves are studied. Let γ be a piecewise smooth, simple closed curve on a complete totally geodesic surface S in the base space. Then the holonomy displacement along γ is given by V(γ)=eλ A(γ) i where A(γ) is the area of the region on the surface S surrounded by γ; λ=1/2 or 0 depending on whether S is a complex submanifold or not. We also carry out a similar investigation for the complex Heisenberg group R H2n+1 Cn.
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