Transportation on spheres via an entropy formula
Abstract
The paper proves transportation inequalities for probability measures on spheres for the Wasserstein metrics with respect to cost functions that are powers of the geodesic distance. Let μ be a probability measure on the sphere Sn of the form dμ =e-U(x)dx where dx is the rotation invariant probability measure, and (n-1)I+Hess\,U≥ UI, where U>0. Then any probability measure of finite relative entropy with respect to μ satisfies Ent(μ) ≥ (U/2)W2(, μ )2. The proof uses an explicit formula for the relative entropy which is also valid on connected and compact C∞ smooth Riemannian manifolds without boundary. A variation of this entropy formula gives the Lichn\'erowicz integral.
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