Almost positive kernels on compact Riemannian manifolds

Abstract

We show how to build a kernel \[ KX(x,y)=Σm=0Xh(λm/λX)m(x)m(y) \] on a compact Riemannian manifold M, which is positive up to a negligible error and such that KX(x,x)≈ X. Here 0=λ02λ12… are the eigenvalues of the Laplace-Beltrami operator on M, listed with repetitions, and 0,\,1,… an associated system of eigenfunctions, forming an orthonormal basis of L2(M). The function h is smooth up to a certain minimal degree, even, compactly supported in [-1,1] with h(0)=1, and KX(x,y) turns out to be an approximation to the identity.