The Geometry of Loop Spaces IV: Closed Sasakian Manifolds
Abstract
We prove that a closed regular (4k+1)-Sasakian manifold (M,h0) admits a family of non-isometric metrics h, ≥ 0, such that π1( Isom(M, h)), the fundamental group of the isometry group, is infinite for >0. For M= S4k+1, this result holds for all >0, but fails at =0.
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