Center of mass and K\"ahler structures
Abstract
There is a sequence of positive numbers δ2n, such that for any connected 2n-dimensional Riemannian manifold M, there are two mutually exclusive possibilities: 1) There is a complex structure on M making it into a K\"ahler manifold, or 2) For any almost complex structure J compatible with the metric, at every point p∈ M, there is a smooth loop γ at p such that dist(Jp, holγ-1Jpholγ)> δ2n.
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