Numerical reconstruction from the Fourier transform on the ball using prolate spheroidal wave functions

Abstract

We implement numerically formulas of [Isaev, Novikov, arXiv:2107.07882] for finding a compactly supported function v on Rd, d≥ 1, from its Fourier transform F [v] given within the ball Br. For the one-dimensional case, these formulas are based on the theory of prolate spheroidal wave functions, which arise, in particular, in the singular value decomposition of the aforementioned band-limited Fourier transform for d = 1. In multidimensions, these formulas also include inversion of the Radon transform. In particular, we give numerical examples of super-resolution, that is, recovering details beyond the diffraction limit.