Parseval wavelet frames on Riemannian manifold

Abstract

We construct Parseval wavelet frames in L2(M) for a general Riemannian manifold M and we show the existence of wavelet unconditional frames in Lp(M) for 1 < p <∞. This is made possible thanks to smooth orthogonal projection decomposition of the identity operator on L2(M), which was recently proven by the authors in arXiv:1803.03634. We also show a characterization of Triebel-Lizorkin Fp,qs(M) and Besov Bp,qs(M) spaces on compact manifolds in terms of magnitudes of coefficients of Parseval wavelet frames. We achieve this by showing that Hestenes operators are bounded on manifolds M with bounded geometry.