Gaussian kernels on non-simply-connected closed Riemannian manifolds are never positive definite
Abstract
We show that the Gaussian kernel \-λ dg2(, )\ on any non-simply-connected closed Riemannian manifold (M,g), where dg is the geodesic distance, is not positive definite for any λ > 0, combining analyses in the recent preprint~[9] by Da Costa--Mostajeran--Ortega and classical comparison theorems in Riemannian geometry.
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