Continuous Wavelets on Compact Manifolds

Abstract

Let M be a smooth compact oriented Riemannian manifold, and let M be the Laplace-Beltrami operator on M. Say 0 ≠ f ∈ S(+), and that f(0) = 0. For t > 0, let Kt(x,y) denote the kernel of f(t2 M). We show that Kt is well-localized near the diagonal, in the sense that it satisfies estimates akin to those satisfied by the kernel of the convolution operator f(t2) on n. We define continuous S-wavelets on M, in such a manner that Kt(x,y) satisfies this definition, because of its localization near the diagonal. Continuous S-wavelets on M are analogous to continuous wavelets on n in S(n). In particular, we are able to characterize the Holder continuous functions on M by the size of their continuous S-wavelet transforms, for Holder exponents strictly between 0 and 1. If M is the torus 2 or the sphere S2, and f(s)=se-s (the ``Mexican hat'' situation), we obtain two explicit approximate formulas for Kt, one to be used when t is large, and one to be used when t is small.