The Geometry of Loop Spaces III: Isometry Groups of Contact Manifolds
Abstract
Let Mp be a circle bundle with first Chern class p[ω] over a closed 4n-dimensional integral symplectic manifold (M,ω). Equivalently, Mp is a closed contact (4n+1)-manifold whose Reeb orbits are all closed and have the same period. For a metric g on Mp compatible with the symplectic structure and the geometry of the circle fiber, we use Wodzicki-Chern-Simons forms on the loop space LMp to prove that π1( Isom(Mp,g)) is infinite for |p| 0. We also give the first high-dimensional examples of nonvanishing Wodzicki-Pontryagin forms.
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