Sampling theorems for inverse problems on Riemannian manifolds

Abstract

We consider inverse problems consisting of the reconstruction of an unknown signal f from noisy measurements y=Ff+noise, where Ff is a function on a Riemannian manifold without boundary M. We consider the case when only pointwise samples are available, namely yj = (Ff)(xj)+ηj, where \xj\j=1n⊂eq M is a Marcinkiewicz-Zygmund family. We derive sampling theorems providing explicit bounds on the reconstruction error depending on n, the smoothness of f and the properties of F. We study in detail the case when F is a convolution on a compact two-point homogeneous space. As a corollary, we state a sampling theorem for convolutions on the two-dimensional sphere, and discuss four relevant examples related to terrestrial and celestial measurements.