On Projections of Metric Spaces
Abstract
Let X be a metric space and let μ be a probability measure on it. Consider a Lipschitz map T: X → , with Lipschitz constant ≤ 1. Then one can ask whether the image TX can have large projections on many directions. For a large class of spaces X, we show that there are directions φ ∈ on which the projection of the image TX is small on the average, with bounds depending on the dimension n and the eigenvalues of the Laplacian on X.
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