Exponential polynomials and identification of polygonal regions from Fourier samples

Abstract

Consider the set E(D, N) of all bivariate exponential polynomials f(, η) = Σj=1n pj(, η) e2π i (xj+yjη), where the polynomials pj ∈ C[, η] have degree <D, n N and where xj, yj ∈ T = R/Z. We find a set A ⊂eq Z2 that depends on N and D only and is of size O(D2 N N) such that the values of f on A determine f. Notice that the size of A is only larger by a logarithmic quantity than the number of parameters needed to write down f. We use this in order to prove some uniqueness results about polygonal regions given a small set of samples of the Fourier Transform of their indicator function. If the number of different slopes of the edges of the polygonal region is k then the region is determined from a predetermined set of Fourier samples that depends only on k and the maximum number of vertices N and is of size O(k2 N N). In the particular case where all edges are known to be parallel to the axes the polygonal region is determined from a set of O(N N) Fourier samples that depends on N only. Our methods are non-constructive.